Silkepil EverSoft 2590 - Epilator BRAUN - Free user manual and instructions
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USER MANUAL Silkepil EverSoft 2590 BRAUN
Portugues 18, 53, 55
Italian 22, 53, 55
Türkce 26, 55
Româna 30,54,55
Eληνικα 34,54,55
34, 39, 55
51,45,55
GB Helpline
Should you require any further assistance please call Braun (UK) Consumer Relations on 0800 783 70 10
IRL Helpline
1800509448
Our products are engineered to meet the highest standards of quality, functionality and design. We hope you thoroughly enjoy your new Silk-épil.
In the following, we want to make you familiar with the appliance and provide some useful information on epilation.
Please read the use instructions carefully and completely before using the appliance.
The Silk-épil EverSoft Body Epilation is equipped with two different heads for epilating:
- The high-precision epilation head is specifically designed for a gentle and long-lasting hair removal. Generally, hair will regrow finer and softer. The Silk-épil epilation system ensures that the epilation process is gentler and more efficient. Even hairs as short as 0.5mm in length are removed from the root.
The high-precision epilation head
② comes with two different attachments:
The 4-way moving pain softener which makes the epilation ultra gentle. Its pulsating movement stimulates and relaxes the skin to offset the pulling sensation.
The EfficiencyPro clip provides a thorough epilation that is now even faster. Ensuring maximal skin contact and the optimal
usage position, it allows removal of even more hairs per stroke.
- The underarm epilation head is perfectly suited to follow the contours of delicate body parts such as under the arms and the bikini lines. A reduced number of tweezers and the narrow design, specifically adapted to these body areas, improve the handling and ensure a particularly gentle epilation in these areas.
Important
- This appliance must never be used near water (e.g. a filled wash basin, bathtub or shower).
- Keep the appliance out of the reach of children.
- Before use, check whether your voltage corresponds to the voltage printed on the transformer. Always use the country-specific 12V transformer plug supplied with the product.
Description (see page 4)
1a 4-way moving pain softener
EfficiencyPro clip
② Epilation head with tweezer element
③ Release buttons
④ Switch
⑤ Socket for cord connector
Cord connector
⑦ 12 V transformer plug
Underarm epilation head with tweezer element
General information on epilation All methods of hair removal at the roots can lead to minor skin injure and in-growing hairs. All microinjuries caused by plucking hairs may lead to inflammation through the penetration of bacteria into the skin (e.g. when sliding the appliance over the skin).
Thoroughly cleaning the tweezer head before each use minimizes the risk of infection.
When first removing hairs from the root you may experience some irritation depending on the condition of your skin and hair (e.g. discomfort and reddening of the skin). This is a normal reaction that will quickly disappear.
If, after 36 hours, your skin still shows irritations, we recommend you contact your physician. In general, the skin reactions and the sensation of pain tend to diminish considerably with the repeated use of Silk-épil.
If you have any doubts about using this appliance, please consult your physician. In the following cases, this appliance should only be used after prior consultation with a physician:
- eczema, wounds, inflamed skin reactions such as folliculitis (purulent hair follicles) and varicose veins
around moles - reduced immunity of the skin, e.g. diabetes mellitus, during pregnancy, Raynaud's disease
- haemophilia or immune deficiency.
Silk-épil is designed to remove hair on legs, but can also be used on all sensitive areas like forearms, underarms or the bikini line.
When switched on, the appliance must never come in contact with the hair on your head, eyelashes, ribbons, etc. to prevent any danger of injury as well as to prevent blockage or damage to the appliance.
Some useful tips
For the first use or if not having epilated for a long time, we recommend that you first shave longer hairs. After 1-2 weeks, it is much easier and more comfortable to epilate the regrowing, short hairs. Before epilating, you may as well pre-cut long hairs to a length of 2 to 5 mm.
Hair is easier to remove after bathing or showering. However, hair and skin must be completely dry. After epilating, we recommend applying a moisture cream to relax the skin and relieve slight skin irritations.
In the beginning, it is advisable to epilate in the evening, so that any possible reddening can disappear overnight.
The fine hairs which regrow might not manage to get through to the skin surface. In order to prevent in-growing hairs, we recommend the regular use of massage sponges (e.g. after showering) or exfoliation peelings. By a gentle scrubbing
action, the upper skin layer is removed and fine hairs can get through to the skin surface.
How to epilate
- Your skin must be dry and free from grease or cream.
Before starting off, thoroughly clean epilation heads and. - For leg epilation, choose epilation head 2put it on and make sure that the 4-way moving pain softener 1a is in place.
- For underarm and bikini line epilation, we recommend that you use the epilation head without attachment (1).
To change the epilation heads, press the release buttons on the left and right and pull off the epilation head. -
Plug the cord connector into the socket and plug the transformer plug into an electrical outlet.
-
To turn on the appliance, slide switch 4up to setting 2 ( 2 = normal epilation, 1 = gentle epilation).
-
Rub your skin to lift short hairs. Hold the appliance at right angles (90^) against your skin and guide it against the hair growth and in the direction of the switch. Both rollers of the 4-way moving pain softener should always be kept in contact with the skin, allowing the pulsating movements to stimulate and relax the skin for a gentler epilation.
If you are used to epilation and look for a faster way to efficiently remove hair, please use the EfficiencyPro clip Placed on the epilator head instead of the 4-way moving pain softener, it allows maximum skin contact and ensures optimum usage so that more hairs are removed in one stroke.
- Leg epilation (epilation head ② with attachment 100 Epilate your legs from bottom upwards.When epilating behind the knee, keep the leg stretched out straight.
- Underarm and bikini line epilation (underarm epilation head) User tests monitored by dermatologists have shown that you may epilate under the arm and at the bikini line as well. For this specific application, the narrow underarm epilation head has been developed. Thanks to its specific design adapted to the contours of these areas it provides a gentle and thorough epilation. Be aware that these areas are particularly sensitive to pain. However, the pain sensation will diminish with repeated usage.
For this specific application, we would like to give the following advice:
Before epilating, thoroughly clean the respective area to remove residue (like deodorant).
Then dry with a towel, carefully using a dabbing action.
When epilating underarm, keep your arm raised up and guide the appliance in different directions.
Cleaning the epilation head
- After epilating, unplug the appliance and clean the epilation head used:
If you have used one of the attachments 1a1b first remove it and clean it with the brush. - Thoroughly clean the tweezer element with the cleaning brush and also with cleaning fluid (e.g. alcohol). While cleaning, you can turn the tweezer element manually. To remove the epilation head, press the release buttons on the left and right and pull it off.
- Give the top of the housing a quick clean with the brush. Place the epilation head and the 4-way moving pain softener back on the housing.
Subject to change without notice.
This product conforms to the EMC-Directive 89/336/EEC and to the Low Voltage Regulation (73/23 EEC).
François
Description (cf. page 4)
Country of origin: France
Year of manufacture
To determine the year of manufacture, refer to the 3-digit production code located near the socket. The first digit of the production code refers to the last digit of the year of manufacture. The next two digits refer to the calendar week in the year of the manufacture.
Example: "340" - The product was manufactured in week 40 of 2003.
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$$ \begin{array}{c} \frac {1}{2} \frac {\partial \phi}{\partial t} + \frac {\partial \phi}{\partial x} = 0 \ \frac {\partial \phi}{\partial t} + \frac {\partial \phi}{\partial y} = 0 \ \frac {\partial \phi}{\partial t} + \frac {\partial \phi}{\partial z} = 0 \end{array} $$
$$ \begin{array}{l} \text {⑤} \ \text {⑥} \ \text {⑦} \ \text {④} \ \text {④} \ \text {④} \ \text {④} \ \text {④} \ \text {④} \ \text {④} \ \text {④} \ \text {④} \ \text {④} \ \text {④} \ \text {④} \ \text {④} \ \text {④} \ \text {④} \end{array} $$
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$$ j _ {i} \cdot j _ {i} ^ {\prime} x _ {i} k ^ {\prime} i _ {i} b _ {i} b _ {i} ^ {\prime} b _ {i} a _ {i} b _ {i} ^ {\prime} $$
$$ . \dot {a} \dot {b} \dot {c} \dot {d} \dot {e} \dot {f} \dot {g} \dot {h} \dot {i} \dot {j} \dot {k} \dot {l} \dot {m} \dot {n} $$
$$ \circ \circ \circ \circ \circ \circ \circ \circ \circ \circ \circ \circ \circ \circ \circ \circ \circ \circ \circ \circ \circ \circ \circ \circ \circ \circ \circ $$
$$ \therefore \text {i} \left[ \begin{array}{l l l l l l l} \end{array} \right] $$
$$ \begin{array}{l} \left. \int_ {0} ^ {\infty} \varepsilon_ {1} \right| _ {0} ^ {\infty} \left| \frac {1}{x} \right| _ {0} ^ {\infty} \ . (a _ {1} + 1, b _ {1} + 1, a _ {2} + 1, b _ {2} + 1) \ \end{array} $$
$$ \begin{array}{l} \left. \right| _ {j} \left| _ {j} \right| _ {j} \left| _ {j} \right| _ {j} \left| _ {j} \right| _ {j} \ j _ {i j} \downarrow j _ {i j} \downarrow j _ {i j} \downarrow j _ {i j} \downarrow \ \ddot {a} \dot {b} \dot {l} \dot {l} \dot {l} \dot {l} \dot {l} \dot {l} \dot {l} \dot {l} \dot {l} \dot {l} \dot {l} \dot {l} \dot {l} \ J _ {g} \leq p \cdot \frac {1}{2} \cdot \frac {1}{2} \cdot \frac {1}{2} \cdot \frac {1}{2} \cdot \frac {1}{2} \cdot \frac {1}{2} \ \therefore \lim _ {x \rightarrow - \infty} \frac {\log_ {1 0} x}{\log_ {2 0} x} = \frac {\log_ {1 0} x}{\log_ {2 0} x} \ . b l j 1 r i d j o s \ \end{array} $$
$$ l _ {i j} \sim l _ {j i} \sim_ {s} \dots \text {上} _ {j i} \sim_ {s} \dots \text {上} _ {i j} $$
$$ r _ {1} \leqslant \frac {1}{2} \sum_ {i = 1} ^ {n} \frac {1}{2} \sum_ {j = 1} ^ {m} \frac {1}{2} \sum_ {k = 1} ^ {n - j} \frac {1}{2} \sum_ {l = 1} ^ {m - k} | s _ {i} | $$
$$ \begin{array}{l} \ddot {a} \dot {a} \dot {a} \dot {a}, \dot {a} \dot {a} \dot {a} \dot {a} \dot {a} \dot {a} \dot {a} \dot {a} \dot {a} \dot {a} \dot {a} \dot {a} \ \mathrm {N L} \rightarrow \mathrm {L} \rightarrow \mathrm {L}, \mathrm {L} \rightarrow \mathrm {L}, \mathrm {L} \rightarrow \mathrm {L}, \mathrm {L} \rightarrow \mathrm {L}, \mathrm {L} \rightarrow \mathrm {L}, \ - \Delta_ {i j} J _ {i j k l} ^ {j k l} \geqslant 1, \ . \downarrow_ {i} \ \end{array} $$
$$ (3 \text {a} _ {\alpha \alpha \alpha \alpha}) $$
$$ \therefore \Delta_ {a} ^ {\prime} = \frac {1}{2} a _ {1} + \frac {1}{2} a _ {2} + \dots + \frac {1}{2} a _ {n} $$
$$ \text {s u i n i t e l b a l o} ① \mathrm {b} $$
$$ b a l o \geqslant j _ {j} = ② $$
$$ \text {③} $$
$$ \left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right} 7 $$
$$ b a l o \neq \text {i n} b y 1 \text {j e t} j z \tag {8} $$
$$ \int_ {D} \int_ {D} \int_ {D} \int_ {D} \int_ {D} \int_ {D} \int_ {D} \int_ {D} \int_ {D} \int_ {D} \int_ {D} \int_ {D} \int_ {D} \int_ {D} \int_ {D} \int_ {D} \int_ {D} \int_ {0} ^ {\infty} $$
$$ j _ {i} ^ {a} $$
$$ \begin{array}{l} j _ {i} = \left{ \begin{array}{l l} 1, & j _ {i} \text {在 线} \ 2, & j _ {i} \text {在 网 上} \end{array} \right. \ \dot {3} \geq 3 > 3! \leq 3 > 3! < 3 > < 3 > < 3 > \ \mathrm {J} \dot {\mathrm {s}} \mathrm {s} \dot {\mathrm {s}} \mathrm {s} \dot {\mathrm {s}} \mathrm {s} \dot {\mathrm {s}} \mathrm {s} \dot {\mathrm {s}} \mathrm {s} \dot {\mathrm {s}} \mathrm {s} \dot {\mathrm {s}} \ \left. \right.\left. \right.\left. \right.\left. \right.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right. \ \therefore \left| \right| _ {1} = \left| \right| _ {2} = \left| \right| _ {3} = \dots \ \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \ . (l _ {1} \downarrow l _ {2} \downarrow l _ {3} \downarrow) \ \end{array} $$
$$ \omega_ {g} \geqslant \frac {1}{2} \sum_ {i = 1} ^ {n} \sum_ {j = 1} ^ {m} \sum_ {l = 1} ^ {n} $$
$$ . \bar {s} _ {i j k l} \bar {s} _ {j k l} \bar {s} _ {i j k l} \bar {s} _ {j k l} \bar {s} _ {i j k l} $$
$$ \left. \forall j _ {1} \dots 1 \right| i = n, j = 1, 2, \dots , k $$
$$ : \ddot {a} _ {a} a _ {a} a _ {b} o l a l y \downarrow p i s c i e n t $$
$$ J _ {i j} \geqslant 2, 3, 4, 5, 6, 7, 8, 9 $$
$$ \downarrow \uparrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow $$
$$ \left. \right.\left. \right\rvert\left. \right.\left. \right\rvert\left. \right.\left. \right\rvert\left. \right.\left. \right\rvert\left. \right.\left. \right\rvert\left. \right.\left. \right\rvert\left.\right.\left. \right\rvert\left.\right.\left. \right\rvert\left.\right.\left. \right\rvert\left.\right.\left. \right. $$
$$ . \ddot {o} o _ {1} \dot {s} \dot {s} \dot {s} \dot {s} \dot {s} \dot {s} \dot {s} \dot {s} $$
$$ \therefore \text {O} _ {2} + \Delta = \text {L} _ {1} + \Delta_ {1} + \Delta_ {2} + \dots $$
$$ \therefore \frac {1}{2} \frac {1}{3} \frac {1}{4} \frac {1}{5} \frac {1}{6} \frac {1}{7} \frac {1}{8} \frac {1}{9} \frac {1}{1 0} \dots $$
$$ \left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right\rangle_ {0} ^ {1} = 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, $$
$$ \cdot \dot {s} $$
$$ . \dot {a} c l l \text {s o} \dot {j} \dot {j} \dot {j} \dot {j} \dot {j} \dot {j} \dot {j} \dot {j} \dot {j} \dot {j} \dot {j} - $$
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$$ \begin{array}{r l} & \text {a b c d e f a g e} \ & \text {a b c d e f a g e} \ & \text {a b c d e f a g e} \ & \text {a b c d e f a g e} \ & \text {a b c d e f a g e} \ & \text {a b c d e f a g e} \ & \text {a b c d e f a g e} \ & \text {a b c d e} \ & \text {a b c d e f a g e} \ & \text {a b c d e f a g e} \ & \text {a b c d e f a g e} \ & \text {a b c d e f a g e} \ & \text {a b c d e f a g e} \ & \text {a b c d e f a g e} \ & \text {a b d e f a g e} \ & \text {a b d e f a g e} \ & \text {a b d e f a g e} \ & \text {a b d e f a g e} \ & \text {a b d e f a g e} \ & \text {a b d e f a g e} \ & \text {a b d e f a g e} \ & \text {a b d c d e f a g e} \ & \text {a b d c d e f a g e} \ & \text {a b d c d e f a g e} \ & \text {a b d c d e f a g e} \ & \text {a b d c d e f a g e} \ & \text {a b d c d e f a g e} \ & \text {a b d c d e f 1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 1} \ & \text {a b d c d e f a g e} \ & \text {a b d c d e f a g e} \ & \text {a b d c d e f a g e} \ & \text {a b d c d e f a g e} \ & \text {a b d c d e f a g e} \ & \text {a b d c d e f a g e} \ & {\mathrm {a b d c d e}} \ & {\mathrm {a b d c d e}} \ & {\mathrm {a b d c d e}} \ & {\mathrm {a b d c d e}} \ & {\mathrm {a b d c d e}} \ & {\mathrm {a b d c d e}} \ & {\mathrm {a b d c d e}} \ & {\mathrm {a b d c d e}} \ & {\mathrm {a b d c d e}} \ & {\text {a b d c d e}} \ & {\mathrm {a b d c d e}} \ & {\mathrm {a b d c d e}} \ & {\mathrm {a b d c d e}} \ & {\mathrm {a b d c d e}} \ & {\mathrm {a b d c d e}} \ & {\mathrm {a b d c d e}} \ & {\mathrm {a b d c d e}} \ & {\mathrm {a b}} \ & {\mathrm {b}} \ & {\mathrm {c}} \ & {\mathrm {d}} \ & {\mathrm {e}} \ & {\mathrm {f}} \ & {\mathrm {g}} \ & {\mathrm {h}} \ & {\mathrm {i}} \ & {\mathrm {j}} \ & {\mathrm {k}} \ & {\mathrm {l}} \ & {\mathrm {m}} \ & {\mathrm {n}} \ & {\mathrm {o}} \ & {\mathrm {p}} \ & {\mathrm {q}} \ & {\mathrm {r}} \ & {\mathrm {s}} \ & {\mathrm {t}} \ & {\mathrm {u}} \ & {\mathrm {v}} \ & {\mathrm w} \end{array} $$
$$ \begin{array}{l} \text {c l}, \text {d s} \text {j a n o l y} \text {j b r o d} \ \text {c . c .} \text {i g m a} \text {x i} \text {s l} \text {c . c .} \text {i g m a} \text {j a n o l y} \end{array} $$
$$ \begin{array}{l} \text {L} _ {\text {L}} \ \text {L} _ {\text {L}} \ \text {L} _ {\text {L}} \ \text {L} _ {\text {L}} \ \text {L} _ {\text {L}} \ \text {L} _ {\text {L}} \ \text {L} _ {\text {L}} \ \text {L} _ {\text {L}} \ \text {L} _ {\text {L}} \ \text {R} _ {\text {L}} \ \text {R} _ {\text {L}} \ \text {R} _ {\text {L}} \ \text {R} _ {\text {L}} \ \text {R} _ {\text {L}} \ \text {R} _ {\text {L}} \ \text {R} _ {\text {L}} \ \text {R} _ {\text {L}} \ \text {R} _ {\mathrm {L}} \ \text {R} _ {\mathrm {L}} \ \text {R} _ {\mathrm {L}} \ \text {R} _ {\mathrm {L}} \ \text {R} _ {\mathrm {L}} \ \text {R} _ {\mathrm {L}} \ \text {R} _ {\mathrm {L}} \ \text {R} _ {\mathrm {L}} \ \text {R} _ {\mathrm {L}} \end{array} $$
$$ \begin{array}{c} \underline {{\text {L a l}}} _ {\underline {{\nu}}} \underline {{\nu}} _ {\underline {{\omega}}} \underline {{\omega}} _ {\underline {{\omega}}} \ \text {L a l} _ {\underline {{\nu}}} \text {L a l} _ {\underline {{\omega}}} \text {L a l} _ {\underline {{\omega}}} \ \text {L a l} _ {\underline {{\nu}}} \text {L a l} _ {\underline {{\omega}}} \text {L a l} _ {\underline {{\omega}}} \ \text {L a l} _ {\underline {{\nu}}} \text {L a l} _ {\underline {{\omega}}} \text {L a l} _ {\underline {{\omega}}} \ \text {L a} _ {\underline {{\nu}}} \text {L a} _ {\underline {{\omega}}} \text {L a} _ {\underline {{\omega}}} \ \text {L a l} _ {\underline {{\nu}}} \text {L a l} _ {\underline {{\omega}}} \text {L a l} _ {\underline {{\omega}}} \ \text {L a l} _ {\underline {{\nu}}} \text {L a l} _ {\underline {{\omega}}} \text {L a l} _ {\underline {{\omega}}} \ \text {L} _ {\underline {{\nu}}} \text {L} _ {\underline {{\omega}}} \text {L} _ {\underline {{\omega}}} \ \text {L} _ {\underline {{\nu}}} \text {L} _ {\underline {{\omega}}} \text {L} _ {\underline {{\omega}}} \ \text {L} _ {\underline {{\nu}}} \text {L} _ {\underline {{\omega}}} \text {L} _ {\underline {{\omega}}} \ \text {L} _ {\underline {{\nu}}} \text {L}. \end{array} $$
$$ \begin{array}{c} \text {i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s i s} \ \text {i t a l y} \quad \text {i t a l y} \quad \text {i t a l y} \quad \text {i t a l y} \quad \text {i t a l y} \quad \text {i t a l y} \quad \text {i t a l y} \quad \text {i t a l y} \quad \text {i t a l y} \quad \text {i t a l y} \quad ① \ \text {i t a l y} \quad \text {i t a l y} \quad \text {i t a l y} \quad \text {i t a l y} \quad \text {i t a l y} \quad \text {i t a l y} \quad \text {i t a l y} \quad \text {i t a l y} \quad \text {i t a l y} \end{array} $$
$$ \begin{array}{l} \text {o u t s i g m a} \ \text {p h i s e . (K I L X i o)} \ \text {c o n d s i g m a . c o n d s i g m a . c o n d s i g m a . c o n d s i g m a . c o n d s i g m a . c o n d s i g m a . c o n d s i g m a . c o n d s i g m a . c o n d s i g m a . c o n d s i g m a . c o n d s i g m a .} \end{array} $$
$$ \begin{array}{l} \frac {b i j k l m n o p q r s t u v w e x - 4}\underline \underline \underline \underline {{\underline {{\underline {{\underline {{\underline {{\underline {{\underline {{\underline {{\underline {{\underline {{\underline {{\underline {{\underline {{\underline {{\underline {{\underline {{\underline {{\underline {{\underline {{\underline {{\underline {{\underline {{\underline {{\underline {{\underline {{\underline {{\underline {{\underline {{\underline {{\underline {{\underline {{-}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}}} \ \quad : (8) \ \quad \circ \text {d i a g} \left| \begin{array}{l} j \end{array} \right| \text {t o t a l} \text {j} \text {i} \text {a} \text {s} \text {c} \text {t} \text {e} \text {g} \text {o} \text {y} \text {u} \text {n} \text {s} \text {t} \text {c} \text {s} \text {t} \text {u} \text {s} \text {t} \text {u} \text {s} \text {t} \text {u} \text {s} \text {t} \text {u} \text {s} \text {t} \text {u} \text {s} \text {t} \text {u} \text {s} \text {t} \text {u} \text {s} \text {u} \text {s} \text {t} \text {u} \text {s} \text {t} \text {u} \text {s} \text {t} \text {u} \text {s} \text {t} \text {u} \text {s} \text {t} \text {u} \text {s} \text {t} \text {u} \text {t} \text {u} \text {s} \text {t} \text {u} \text {s} \text {t} \text {u} \text {s} \text {t} \text {u} \text {s} \text {t} \text {u} \text {s} \text {t} \text {u} \text {s} \text {t} \text {t h e t a t h e t a t h e t a t h e t a t h e t a t h e t a t h e t a t h e t a t h e t a t h e t a t h e t a t h e t a t h e t a t h e t a t h e t a t h e t a t h e t a t h e t a t h e t a t h e t a t h e t a}} \ \quad j _ {\mathrm {i n}} ^ {\prime} = j _ {\mathrm {i n}} ^ {\prime}, j _ {\mathrm {i n}} ^ {\prime}, j _ {\mathrm {i n}} ^ {\prime}, j _ {\mathrm {i n}} ^ {\prime}, j _ {\mathrm {i n}} ^ {\prime}, j _ {\mathrm {i n}} ^ {\prime}, j _ {\mathrm {i n}} ^ {\prime}, j _ {\mathrm {i n}} ^ {\prime}, j _ {\mathrm {i n}} ^ {\prime}, j _ {\textrm {(r)}} ^ {\prime}, j _ {\textrm {(r)}} ^ {\prime}, j _ {\textrm {(r)}} ^ {\prime}, j _ {\textrm {(r)}} ^ {\prime}, j _ {\textrm {(r)}} ^ {\prime}, j _ {\textrm {(r)}} ^ {\prime}, j _ {\textrm {(r)}} ^ {\prime}, j _ {\textrm {(r)}} ^ {\prime}, j _ {\tex tr m (r)} ^ {\prime}, j _ {\textrm {(r)}} ^ {\prime}, j _ {\textrm {(r)}} ^ {\prime}, j _ {\textrm {(r)}} ^ {\prime}, j _ {\textrm {(r)}} ^ {\prime}, j _ {\textrm {(r)}} ^ {\prime}, j _ {\textrm {(r)}} ^ {\prime}, j _ {\textrm {(r)}} ^ {\prime}, j _ {\tex extrm {(r)}} ^ {\prime}, j _ {\textrm {(r)}} ^ {\prime}, j _ {\textrm {(r)}} ^ {\prime}, j _ {\textrm {(r)}} ^ {\prime}, j _ {\textrm {(r)}} ^ {\prime}, j _ {\textrm {(r)}} ^ {\prime}, j _ {\textrm {(r)}} ^ {\prime}, j _ {\textrm {(r)}} ^ {\prime}, J _ {\textrm {(r)}} ^ {\prime}, J _ {\textrm {(r)}} ^ {\prime}, J _ {\textrm {(r)}} ^ {\prime}, J _ {\textrm {(r)}} ^ {\prime}, J _ {\textrm {(r)}} ^ {\prime}, J _ {\textrm {(r)}} ^ {\prime}, J _ {\textrm {(r)}} ^ {\prime}, J _ {\textrm {(r)}}, J _ {\textrm {(r)}} ^ {\prime}, J _ {\textrm {(r)}} ^ {\prime}, J _ {\textrm {(r)}} ^ {\prime}, J _ {\textrm {(r)}} ^ {\prime}, J _ {\textrm {(r)}} ^ {\prime}, J _ {\textrm {(r)}} ^ {\prime}, J _ {\textrm {(r)}} ^ {\prime}, J _ {\textrm {(r) s}}. \ \quad . c u l l \ \quad , b i j k l m n o p q r s t u v w e x - 4 \ \quad , d i a g (3) | | d i a g (2) | | d i a g (1) | | d i a g (0) | | d i a g (1) | | d i a g (2) | | d i a g (3) | | d i a g (1) | | d i a g (2) | | d i a g (3) | | d i a g (1) | | d i a g (2) | | d i a g (3) | | d i a g (1) | | d i a g (2) | | d i a g (3) | | d i a g (1) | | d i a g (2), \ \quad , f i g. 5. 1. 2. 3. 4. 5. 6. 7. 8. 9. 1 0. 1 1. 1 2. 3. 4. 5. 6. 7. 8. 9. 1 0. 1 1. 1 2. 3. 4. 5. 6. 7. 8. 9. 1 0. 1 1. 1 2. 3. 4. 5. 6. 7. 8. 9. 1 1. 1 2. 3. 4. 5. 6. 7. 8. 9. 1 1. 1 2. 3. 4. 5. 6. 7. 8. 9. 1 1. 1 2. 3. 4. 5. 6. 7. 8. 9. 1 1.12.3.4.5.6.7.8.9.10.10.10.10.10.10.10.10.10.10.10.10.10.10.10.10.10.10.10.10.10.10.10.10.10.10.10.10.10.10.10.10.10.10. \end{array} $$
$$ \begin{array}{l} \left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right. \ \mathrm {c} \equiv \mathrm {l}, \mathrm {c l} \equiv \mathrm {l}, \mathrm {l} \equiv \mathrm {l}, \mathrm {l} \equiv \mathrm {l}, \ \therefore \dot {a} \dot {b} \dot {c} \dot {d} \dot {e} \dot {f} \dot {g} \dot {h} \dot {i} \dot {j} \dot {k} \dot {l} \dot {m} \dot {n} \dot {o} \dot {p} \dot {q} \ \left. \int_ {0} ^ {\infty} \frac {1}{x} \right| _ {0} ^ {+ \infty} \int_ {0} ^ {x} \frac {1}{x ^ {2}} d x \ . \ddot {a} \omega \dot {a} \dot {a} \ \end{array} $$
$$ \begin{array}{l} \left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right. \ \mathrm {c} \equiv \mathrm {l}, \mathrm {c l} \equiv \mathrm {l}, \mathrm {l} \equiv \mathrm {l}, \mathrm {l} \equiv \mathrm {l}, \ \therefore \dot {a} \dot {b} \dot {c} \dot {d} \dot {e} \dot {f} \dot {g} \dot {h} \dot {i} \dot {j} \dot {k} \dot {l} \dot {m} \dot {n} \dot {o} \dot {p} \dot {q} \ \left. \int_ {0} ^ {\infty} \frac {1}{x} \right| _ {0} ^ {+ \infty} \int_ {0} ^ {x} \frac {1}{x ^ {2}} d x \ . \ddot {a} \omega \dot {a} \dot {a} \ \left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right\rangle_ {j} ^ {j} j) j (j) j (j) - r \ \mathrm {e} \text {i} \text {j} \text {k} \text {l} \text {i} \text {i} \text {i} \text {i} \text {i} \text {i} \text {i} \text {i} \text {i} \text {i} \text {i} \text {i} \text {i} \text {i} \text {i} \text {i} \text {i} \text {i} \text {i} \text {i} \text {1 2} \ 2 2. \sin \alpha \vert b \overline {{a}} l o, \vert ① a = b > \ \left( \begin{array}{c} 1 b \ \hline \end{array} \right) \ \left. \right.\left. \right.\left. \right.\left. \right.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right. \ \therefore \text {i d} = \text {j a n t i l l} \quad \text {a l l}; \quad \text {i n c}. \quad \text {j e l} \ \therefore \cos \alpha \leqslant 1, \cos \beta \leqslant 2, \cos \gamma \leqslant 3 \ \int \sin \left[ \frac {1}{2} x - 1 \right] d x = \int \sin \left[ \frac {1}{2} x - 1 \right] d x \ \left. \frac {1}{2} \frac {1}{2} \frac {1}{2} \frac {1}{2} \frac {1}{2} \frac {1}{2} \frac {1}{2} \frac {1}{2} \frac {1}{2} \frac {1}{2} \frac {1}{2} \frac {1}{2} \frac {1}{2} \frac {1}{2} \frac {1}{2} \right] \ (8) \therefore \angle A B C = 1 2 0 ^ {\circ} \ \left. \cdot \right| _ {i} ^ {j} \left| \cdot \right| _ {i} ^ {j} \cdot \left| \cdot \right| _ {i} ^ {j} \cdot \left| \cdot \right| _ {i} ^ {j} \ \ddot {a} \dot {u} \dot {u} \dot {u} \dot {u} \dot {u} \dot {u} \dot {u} \dot {u} \dot {u} \dot {u} \dot {u} \ \therefore \text {不} \ \therefore \dot {S} _ {\text {一}} = \frac {1}{2} \dot {S} _ {\text {一}} \dot {S} _ {\text {一}} \ x y b ^ {2} + x d ^ {2} + 1 \cdot \left(x ^ {2} - 1\right) \cdot \left(y ^ {2} - 1\right) \ \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \ \therefore \lim _ {x \rightarrow - \infty} x = 0 \ \therefore \text {i} _ {j} \text {i} _ {j} \text {i} _ {j} \text {i} _ {j} \text {i} _ {j} \text {i} _ {j} \text {i} _ {j} \text {i} _ {j} \text {i} _ {j} \text {i} _ {j} \text {i} _ {j} \text {i} _ {j} \ . \dot {a} \leq r, a _ {0} \ \end{array} $$
$$ \begin{array}{l} ⑤ \text {山} \text {山} ⑥ \text {山} \text {山} \text {山} \text {山} \text {山} \text {山} \text {山} \text {山} \text {山} \text {山} \text {山} \text {山} \text {山} \text {山} \text {山} \text {山} \text {山} \text {山} \text {山} \text {山} \text 山 \ \cdot \dot {l} _ {i} \cdot \dot {l} _ {j} \cdot \dot {l} _ {k} \text {⑦} l _ {j k l} \dot {l} _ {i j} \cdot \dot {l} _ {k l} \ \therefore \left| \frac {1}{2} \right| = \frac {1}{2} \cdot \frac {1}{2} \cdot \frac {1}{2} \cdot \frac {1}{2} \cdot \frac {1}{2} \cdot \frac {1}{2} \cdot \frac {1}{2} \ . \ll 2 \gg \text {a} _ {\text {一}} \text {a} _ {\text {一}} \text {a} _ {\text {一}} \text {a} _ {\text {一}} \text {a} _ {\text {一}} \text {a} _ {\text {一}} \ \langle \text {a} _ {\text {b}} \text {d} _ {\text {c}} \text {d} _ {\text {d}} \text {d} _ {\text {f}} = \ll 2 \rangle) \ . (\ddot {a} \dot {s} \dot {l}; \ddot {a} \dot {l} j _ {!} = \ll 1) \ \end{array} $$
$$ \begin{array}{l} . \text {i} _ {\text {i}} \text {i} _ {\text {i}} \text {i} _ {\text {i}} \text {i} _ {\text {i}} \text {i} _ {\text {i}} \text {i} _ {\text {i}} \text {i} _ {\text {i}} \text {i} _ {\text {i}} \text {i} _ {\text {i}} \text {i} _ {\text {i}} \ \therefore \text {s g a l l} \left| \right| \left| \right| \left| \right| \left| \right| \left| \right| \left| \right| \left| \right| \left| \right| \left| \right| \left| \right| \left| \right| \left| \right| \left| \right| \left| \right| \left| \right| \left| \right| \left| \right| \left| 1 \right| \left| \right| \left| \right| \left| \right| \left| \right| \left| \right| \left| \right| \left| \right| \left| 1 \right| \left| \right| \left| 1 \right| \left| 1 \right| \left| 1 \right| \left| 1 \right| \left| 1 \right| \left| 1 \right| \left| 1 \right| \left| 1 \right| \left| 1 \right| \left| 1 \right| \left| 1 \right| \ \text {S l} _ {\omega \omega} \left(\text {a} \text {a} \text {a} \text {a} \text {a} \text {a} \text {a} \text {a} \text {a} \text {a} \text {a} \text {a} \text {a} \text {a} \text {a} \text {a} \text {a} \text {a} \text {a} \text {a} \text {a} ^ {\prime}\right) \ (9. 0) \overrightarrow {a} \overrightarrow {b} \overrightarrow {c} \overrightarrow {d} \overrightarrow {e} \overrightarrow {f} \overrightarrow {g} \overrightarrow {h} \overrightarrow {i} \overrightarrow {j} \overrightarrow {k} \overrightarrow {l} \ \therefore \dot {a} = \dot {c}, \dot {s} = - \dot {s} \ \int_ {0} ^ {1} \sin (x) d x = \frac {1}{2} \int_ {0} ^ {1} \sin (x) d x = \frac {1}{2} \int_ {0} ^ {1} \sin (x) d x = 1 \ \cdot \text {l a} \cdot \text {y} \leq \cdot \text {c l} \text {a l l} \cdot \text {l a} \cdot \text {f} \text {g} \text {r} \text {a l l} \ \therefore S _ {1} \bot P _ {2} \because \frac {1}{3} \sin \angle A B C = 1 \ \therefore \text {i n} x _ {0} \text {c l o s e} \xi , \text {o u t} \ \therefore \delta_ {i} = \sum_ {j = 1} ^ {n} c _ {i j} \cdot \left[ \sum_ {l = 1} ^ {n} c _ {i l} \right] \ \bar {e} \bar {s} \bar {u} \bar {w} \bar {l} \bar {l} \bar {c} \bar {c} \bar {c} \bar {c} \bar {c} \bar {c} \bar {c} \bar {c} \bar {c} \bar {c} \ \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \ \therefore \dot {a} _ {i j} \dot {a} _ {j i} \dot {a} _ {k l} \dot {a} _ {l k} \dot {a} _ {l j} \ Y. L L L {L _ {1} } {L _ {2} } {L _ {3} } \ \therefore \mathrm {i} _ {\mathrm {i}} = b _ {\mathrm {i}} \ \mathrm {a l l} \varepsilon ; \mathrm {d e l t a} \in {1, 2, \dots , 5 } \ \mathrm {a l l} \mathrm {j} \mathrm {y} \in \left[ \begin{array}{l l l l l l l} \end{array} \right] \ b a l o p \vert \dot {z} = 1, \dots , \dot {z} \vert \dots , \ddot {a} _ {i} \dots , j = 1, \ \text {r} \text {d} \text {a} \text {a} \text {a}. \text {(b)} \text {s} \text {s} \text {s} \text {s} \ \end{array} $$
$$ \begin{array}{c} \text {i s o l a l} \ \text {i s o l a l} \ \text {i s o l a l} \ \text {i s o l a l} \ \text {i s o l a l} \ \text {i s o l a l} \ \text {i s o l a l} \ \text {i s o l a l} \ \text {i s o l a l} \ \text {i s o l a l} \ 1, 2, 3, 4, 5, 6, 7, 8, 9, 1 0, 1 1, 1 2, 1 3, 1 4, 1 5, 1 6, 1 7, 1 8, 1 9, 2 0, 2 1, 2 2, 2 3, 2 4, 2 5, 2 6, 2 7, 2 8, 2 9, 3 0, 3 1, 3 2, 3 3, 3 4, 3 5, 3 6, 3 7, 3 8, 3 9, 4 0, 4 1, 4 2, 4 3, 4 4, 4 5, 4 6, 4 7, 4 8, 4 9, \dots \end{array} $$
$$ \begin{array}{r l} & \text {i n g a m m a} \quad \text {i n g a m m a} \quad \text {i n g a m m a} \quad \text {i n g a m m a} \quad \text {i n g a m m a} \quad \text {i n g a m m a} \quad \text {i n g a m m a} \quad \text {i n g a m m a} \quad \text {i n g a m} \quad \text {i n g a m} \quad \text {i n g a m} \quad \text {i n g a m} \quad \text {i n g a m} \quad \text {i n g a m} \quad \text {i n g a m} \quad \text {i n g a m} \quad \text {i n g a m} \quad \text {i n g a m}. \ & \text {i n g a m m a} \quad \text {i n g a m m a} \quad \text {i n g a m m a} \quad \text {i n g a m m a} \quad \text {i n g a m m a} \quad \text {i n g a m m a} \quad \text {i n g a m m a} \quad \text {i n g a} \quad \text {i n g a} \quad \text {i n g a} \quad \text {i n g a} \quad \text {i n g a} \quad \text {i n g a} \quad \text {i n g a} \quad \text {i n g a} \quad \text {i n g a} \quad \text {i n g a}. \ & \text {i n g a m m a} \quad \text {i n g a m m a} \quad \text {i n g a m m a} \quad \text {i n g a m m a} \quad \text {i n g a m m a} \quad \text {i n g a m m a} \quad \text {i n g a m m a} \quad \text i n 1 0 0 0 p t i s k e r o f 1 0 0 p t i s k e r o f 1 0 0 p t i s k e r o f 1 0 0 p t i s k e r o f 1 0 0 p t i s k e r o f 1 0 0 p t i s k e r o f 1 0 0 p t i s k e r o f 1 0 0 p t i s k o f 1 0 0 p t i s k o f 1 0 0 p t i s k o f 1 0 0 p t i s k o f 1 0 0 p t i s k o f 1 0 0 p t i s k o f 1 0 0 p t i s k o f 1 0 0 p t i s k o f 1 0 0 P S O L A T I E R S O F S L A G O S O F S L A G O S O F S L A G O S O F S L A G O S O F S L A G O S O F S L A G O S O F S L A G O S O F S L A G O S O F S L A G O S O F S L A G O S O F S L A G O S O F S L A G O S O F S L A G O S O F F I R M I N D I C H I T I E R S O F F I R M I N D I C H I T I E R S O F F I R M I N D I C H I T I E R S O F F I R M I N D I C H I T I E R S O F F I R M I N D I C H I T I E R S O F F I R M I N D I C H I T I E R S O F F I R M I N U N D I C H I T I E R S O F F I R M I N U N D I C H I T I E R S O F F I R M I N U N D I C H I T I E R S O F F I R M I N U N D I C H I T I E R S O F F I R M I N U N D I C H I T I E R S O F F I R M I N N D I C H I T I E R S O F F I R M I N N D I C H I T I E R S O F F I R M I N N D I C H I T I E R S O F F I R M I N N D I C H I T I E R S O F F I R M I N N D I C H I T I E R S O F F I R M I N N D I C C H I T I E R S O F F I R M I N N D I C C H I T I E R S O F F I R M I N N D I C C H I T I E R S O F F I R M I N N D I C C H I T I E R S O F F I R M I N N D I C C H I T I E R S O F F I R M I N N D I c h i t i e r s o f f i r m i d e r. $$
$$ \begin{array}{c} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \ \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \ \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat S 6 8 4 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 1 \ \dots \ \dots \ \dots \ \dots \ \dots \ \dots \ \dots \ \dots \ \dots \ \dots \ \dots \ \dots \ \dots \ \dots \ \dots \ $$
$$ \begin{array}{c} \text {i g s i g m a l l} \ \text {i g s i g m a l l} \ \text {i g s i g m a l l} \ \text {i g s i g m a l l} \ \text {i g s i g m a l l} \ \text {i g s i g m a l l} \ \text {i g s i g m a l l} \ \text {i g s i g m a l l} \ \dots \end{array} $$
$$ \begin{array}{c} \text {d i s t r i b u t i o n} \ \text {l a b l e d i s t r i b u t i o n} \ \text {l a b l e d i s t r i b u t i o n} \ \text {l a b l e d i s t r i b u t i o n} \ \text {l a b l e d i s t r i b u t i o n} \ \text {l a b l e d i s t r i b u t i o n} \end{array} $$
$$ \begin{array}{r l} & \text {i f i s i s 1 , p s i j (l o w) l o s l -} \ & \text {i f i s i s 1 , p s i j (l o w) l o s l -} \ & \text {i f i s i s 1 , p s i j (l o w) l o s l -} \ & \text {i f i s i s 1 , p s i j (l o w) l o s l -} \ & \text {i f i s i s 1 , p s i j (l o w) l o s l -} \ & \text {i f i s i s 1 , p s i j (l o w) l o s l -} \ & \text {i f i s i s 1 , p s i j (l o w) l o s l -} \ & \text {i f i s i s 1 , p s i j (l o w) l o s} \ & \text {i f i s i s 1 , p s i j (l o w) l o s} \ & \text {i f i s i s 1 , p s i j (l o w) l o s} \ & \text {i f i s i s 1 , p s i j (l o w) l o s} \ & \text {i f i s i s 1 , p s i t h e r e a n d a l y t h e r e a n d a l y t h e r e a n d a l y t h e r e a n d a l y t h e r e a n d a l y t h e r e a n d a l y t h e r e a n d a l y t h e r e a n d a l y t h e r e a n d a l y t h e r e a n d a l y} \ & \text {i f i s i t h e r e a n d a l y t h e r e a n d a l y t h e r e a n d a l y t h e r e a n d a l y} \ & \text {i f i t h e r e a n d a l y t h e r e a n d a l y t h e r e a n d a l y} \ & \text {i f i t h e r e a n d a l y t h e r e a n d a l y} \ & \text {i f i t h e r e a n d a l y t h e r e a n d a l y} \ & \text {i f i t h e r e a n d a l y t h e r e a n d a l y} \ & \text {i f i t h e} \ & \text {i f i t h e} \ & \text {i f i t h e} \ & \text {i f i t h e} \ & \text {i f i t h e} \ & \text {i f i t h e} \ & \text {i f i t h e} \ & \text {i f i t h e} \ & \text {i f} \ & \text {i f} \ & \text {i f} \ & \text {i f} \ & \text {i f} \ & \text {i f} \ & \text {i f} \ & \text {i f} \ & \text {i f} \ & \text {i f} \ & \text {i f} \ & \text {i f} \ & \text {i f} \ & {\mathrm {t h e}} \ & {\mathrm {t h e}} \ & {\mathrm {t h e}} \ & {\mathrm {t h e}} \ & {\mathrm {t h e}} \ & {\mathrm {t h e}} \ & {\mathrm {t h e}} \ & {\mathrm {t h e}} \ & {\mathrm {t h e}} \ & {\mathrm {t h e}} \ & {\mathrm {t h e}} \ & {\mathrm {t h e}} \end{array} $$
$$ \begin{array}{c} \text {S i l k - e p i l} \ \text {S i l k - e p i l} \ \text {S i l k - e p i l} \ \text {S i l k - e p i l} \ \text {S i l k - e p i l} \ \text {S i l k - e p i l} \ \text {S i l k - e p i l} \ \text {S i l k - e p i l} \ \dots \end{array} $$
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$$ . l _ {j} \leq a b \bar {a}, 0, L, L $$
$$ \begin{array}{l} \leqslant \left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left. 1 a \right)\right]\right]\right]\right]\right]\right]\right]\right]\right]\right]\right]\right]\right]\right]\right]\right]\right]\right]\right]\right] \ \therefore \omega = \frac {1}{2} \left(s _ {1} - s _ {2}\right) \ S \dot {a} \dot {s} \dot {s} > 2 a \dot {s} S \dot {s} 2 a, p. x \ \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \hat {s} \ \Delta \sim \mathrm {j} _ {\mathrm {g o}} \overline {{S}} \sim S, \overline {{S}} = 0, 2, 3 \ \therefore g ^ {2} = 5 \ \end{array} $$
$$ \text {c a l l} \quad \text {i f} \quad \text {E f f i c i e n c y P r o c l i p} \quad 1 b $$
$$ \begin{array}{l} \left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right. \ \therefore \omega_ {1} = \frac {1}{2} \omega_ {2} = \frac {1}{2} \omega_ {3} \ \therefore \text {以} \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \ \dot {s} \dot {s} \dot {s} \dot {s} \dot {s} \dot {s} \dot {s} \dot {s} \dot {s} \dot {s} \dot {s} \ . 2 \times 5 \ \end{array} $$
$$ 2 3 \int_ {1} ^ {2} \int_ {2} ^ {3} \int_ {3} ^ {4} \int_ {4} ^ {5} \int_ {5} ^ {6} \int_ {6} ^ {7} \dots $$
$$ \begin{array}{l} j _ {1} \text {i} _ {2} \text {i} _ {3} \text {i} _ {4} \text {i} _ {5} \text {i} _ {6} \text {i} _ {7} \text {i} _ {8} \text {i} _ {9} \text {i} _ {1 0} \ \therefore \text {c u l} \frac {\mathrm {d} S}{\mathrm {d} t} = \frac {\mathrm {d} S}{\mathrm {d} t}, \text {J i j} \text {J i j} \ \int \sin \left[ \right. \frac {1}{2} \sin \left( \right.\frac {1}{2} \sin \left(\frac {1}{2} \sin \left(\frac {1}{2} \sin \left(\frac {1}{2} \sin \left(\frac {1}{2} \sin \left(\frac {1}{2} \sin \left(\frac {1}{2} \sin \left(\frac {1}{2} \sin \left(\frac {1}{2} \sin \left(\right.\right.\right.\right.\right.\right.\right.\right.\right. \ \therefore \lim _ {x \rightarrow - \infty} \frac {\log_ {1 0} x}{\log_ {2 0} x} = \frac {\log_ {1 0} x}{\log_ {2 0} x} \ \hat {O} _ {2} \sim \hat {O} _ {1} \sim \hat {O} _ {2} \sim \hat {O} _ {1} \sim \hat {O} _ {2} \sim \hat {O} _ {1} \sim \hat {O} _ {2} \ \left. \right.\left. \right.\left. \right.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right. \ \therefore \dot {w} = s \ \end{array} $$
$$ \begin{array}{l} \begin{array}{l} \text {s l o s t i n t e r n a l} \ \text {o u t s u b (L i)} \end{array} \ \begin{array}{c} \text {S i n o} \ \text {S i n o} \ \text {S i n o} \ \text {S i n o} \ \text {S i n o} \ \text {S i n o} \ \text {S i n o} \ \text {S i n o} \ \text {S i n o} \ \text {S i n o} \ \text {S i n o} \ \text {S i n o} \ \ \dot {s} \dot {s} \dot {s} L _ {1} L _ {2} L _ {3} L _ {4} \dots \dots \dots \dots \dots \dots \dots \dots \dots \dots \dots \dots \dots \dots \ \therefore \text {L} _ {\text {X}} \text {L} _ {\text {Y}} \text {L} _ {\text {Z}} \text {L} _ {\text {W}} (\rho K _ {\text {W}}) \ \left| L ^ {2} \right| = \int_ {0} ^ {\infty} \int_ {0} ^ {\infty} \int_ {0} ^ {\infty} \int_ {0} ^ {\infty} \int_ {0} ^ {\infty} \int_ {0} ^ {\infty} \ \therefore \cos \alpha = 1 \ \left. \cdot i j a l - j 1 o s l a t = w a l j \hat {j} \hat {j} \hat {j} \hat {j} \hat {j} \hat {j} \hat {j} \hat {j} \hat {j} \hat {j} \hat {j} \hat {j} \hat {j} \hat {j} \hat {j} \hat {j} \hat {j} \hat {j} \hat {j} \hat {j} \hat {j}\right) \ \cos \angle B _ {1} B _ {2} \sqrt {1}, k _ {j}, j = 0, 1, \dots , \ \therefore \frac {1}{2} x - 1 > 3 - \frac {3}{2} x \ \end{array} $$
$$ \begin{array}{l} \begin{array}{l} \text {s l o s t i n t e r n a l} \ \text {o u t s u b (L i)} \end{array} \ \begin{array}{c} \text {S i n o} \ \text {S i n o} \ \text {S i n o} \ \text {S i n o} \ \text {S i n o} \ \text {S i n o} \ \text {S i n o} \ \text {S i n o} \ \text {S i n o} \ \text {S i n o} \ \text {S i n o} \ \text {S i n o} \ \ \dot {s} \dot {s} \dot {s} L _ {1} L _ {2} L _ {3} L _ {4} \dots \dots \dots \dots \dots \dots \dots \dots \dots \dots \dots \dots \dots \dots \ \therefore \text {L} _ {\text {X}} \text {L} _ {\text {Y}} \text {L} _ {\text {Z}} \text {L} _ {\text {W}} (\rho K _ {\text {W}}) \ \left| L ^ {2} \right| = \int_ {0} ^ {\infty} \int_ {0} ^ {\infty} \int_ {0} ^ {\infty} \int_ {0} ^ {\infty} \int_ {0} ^ {\infty} \int_ {0} ^ {\infty} \ \therefore \cos \alpha = 1 \ \left. \cdot i j a l - j 1 o s l a t = w a l j \hat {j} \hat {j} \hat {j} \hat {j} \hat {j} \hat {j} \hat {j} \hat {j} \hat {j} \hat {j} \hat {j} \hat {j} \hat {j} \hat {j} \hat {j} \hat {j} \hat {j} \hat {j} \hat {j} \hat {j} \hat {j}\right) \ \cos \angle B _ {1} B _ {2} \sqrt {1}, k _ {j}, j = 0, 1, \dots , \ \therefore \frac {1}{2} x - 1 > 3 - \frac {3}{2} x \ \sim \text {S i l k - e p i l E v e r S o f t} \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \ \left. \right.\left. \right.\left. \right.\left. \right.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right. \ \therefore \lim _ {x \to 1} \frac {\sin {x}}{x} \ \therefore \text {d i s} \left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left. 1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 1\right)\right)\right)\right)\right)\right)\right)\right)\right)\right)\right)\right)\right)\right)\right)\right)\right) \ \cos \theta \left| \right| _ {1} \left| \right| _ {2} \left| \right| _ {3} \left| \right| _ {4} \left| \right| _ {5} \left| \right| _ {6} \left| \right| _ {7} \ \therefore \omega = \frac {1}{2} \int_ {0} ^ {\infty} \frac {1}{x} d x = \frac {1}{2} \int_ {0} ^ {\infty} \frac {1}{x} d x = \frac {1}{2} \int_ {0} ^ {\infty} \frac {1}{x} d x = \frac {1}{2} \ \ddot {s} \dot {s} s \dot {s} s \dot {s} s \dot {s} s \dot {s} s \ \text {S i l k} \cdot \text {e p i l} \quad \text {l a m b d a} \ \ddot {j} \dot {q} \dot {q} \dot {q} \dot {q} \dot {q} \dot {q} \dot {q} \dot {q} \dot {q} \dot {q} \dot {q} \dot {q} \dot {q} \dot {q} \dot {q} \dot {q} \dot {q} \ \text {a l i g s l a g o} \rightarrow , \text {d i l y j d o t}, k, \ \therefore \Delta S _ {\Delta A B C} = \frac {1}{2} \cdot \Delta S _ {\Delta A B C} = \frac {1}{2} \cdot 3. 5 \ \therefore \dot {s} = s \ \end{array} $$
English
Guarantee
We grant 2 years guarantee on the product commencing on the date of purchase. Within the guarantee period we will eliminate, free of charge, any defects in the appliance resulting from faults in materials or workmanship, either by repairing or replacing the complete appliance as we may choose. This guarantee extends to every country where this appliance is supplied by Braun or its appointed distributor.
This guarantee does not cover: damage due to improper use, normal wear or use as well as defects that have a negligible effect on the value or operation of the appliance. The guarantee becomes void if repairs are undertaken by unauthorised persons and if original Braun parts are not used.
To obtain service within the guarantee period, hand in or send the complete appliance with your sales receipt to an authorised Braun Customer Service Centre.
For UK only:
This guarantee in no way affects your rights under statutory law.
Français
Garantie
Guarantee and Service Centers
Gillette Australia Pty. Ltd., Private Bag 10, Scoresby, Melbourne, Victoria 3179, 1800641820
Austria
Gibbons Company
21 Reid Street
P.O. Box HM 11
Hamilton
295 00 22
Brasil
Picolli Service,
Rua Túlio Teodoró
de Campos, 209,
São Paulo - SP,
0800 16 26 27
Bulgaria
Stambouli Ltd., 16/A Srebarna Atreet, Sofia, Bulgaria +3592528988
Canada
Gillette Canada Company, 4 Robert Speck Parkway, Mississauga L4Z 4C5, Ontario, (905) 566-5000
Česká Republika
PH SERVIS sro., V Mezihori 2, 18000 Praha 8, 266 310 574
Chile
Viseelec,
Braun Service Center Chile,
Av. Concha y Toro #4399,
Puente Alto,
Santiago,
02 288 25 18
China
Gillette (Shanghai)
Sales Co. Ltd.
550 Sanlin Road, Pudong, Shanghai 200124, 800 820 13 57
Colombia
Gillette de Colombia S.A.,
Calle 100 No. 9A - 45 Piso 3.
Bogotá, D.C.,
01 8000 52 72 85
Croatia
Iskra elektronika d.o.o., Bozidara Magovca 63, 10020 Zagreb, 1-6601777
Cyprus
Kyriakos Papavasiliou
Trading
70, Kennedy Ave., 1663 Nicosia,
© 3572 314111
Danmark
Gillette Group Danmark A/S, Teglholm Allé 15, 2450 Kobenhavn SV,
70150013
Djibouti (Republic de)
Ets. Nouraddine,
International Trading, 25 Makram Ebied Street, P.O. Box 7607, Cairo,
02-2740652
Espana
Braun Espanola S.A., Braun Service, Enrique Granados, 46, 08950 Esplugues de Llobregat (Barcelona), 901 11 61 84
Estonia
Servest Ltd., Raua 55, 10152 Tallinn, 627 87 32
France
Groupe Gillette France - Division Braun, 9, Place Marie Jeanne Bassot, 92693 Levallois Perret Cedex,
(1) 4748 70 00, Minitel 3615 code Braun.
Great Britain
Gillette Group UK Ltd., Braun Consumer Service, Aylesbury Road, Thame OX9 3AX Oxfordshire 0800 783 70 10
Greece
Berson S.A., 47, Agamemnonos, 17675 Kallithea Athens, 1-9 47 87 00
Guadeloupe
Ets. Andre Haan S.A., Zone Industrielle B.P. 335, 97161 Pointe-à-Pitre, 26 68 48
Hong Kong
Audio Supplies Company, Room 506, St. George's Building, 2 ICE House Street, Hong Kong, 25 24-93 77
Hungary
Kisgep KFT, Szepvolgyi ut 35-37 H-1037 Budapest, 13494955
Iceland
Verzlunin Pfaff hf.,
Grenasvegur 13,
Box 714, 121 Reykjavik,
5332222
India
Braun Division, c/o Gillette Div. Op. Pvt. Ltd., 34, Okhla Industrial Estate, New Delhi 110 020, 11 68 30 218
Iran
Tehran Bouran Company
Irtuc Building,
No 874 Enghelab Ave.,
P.O. Box 15815-1391,
Tehran 11318,
02 16 70 23 50
Ireland (Republic of)
Gavin's Electronics, 83/84, Lower Camden Street, Dublin 2, 1800 509 448
Israel
S.Schestowitz Ltd., 8 Shacham Str., Tel-Aviv,49517, 1800335959
Italia
Servizio Consumatori Braun
Gillette Group Italy S.p.A., Via G.B. Pirelli, 18, 20124 Milano, 02/6678623
Jordan
INTERBRANDS
AL Soyfiah district, opp.
Paradaise bakery
AL yousef Building
P.O. Box 9404,
Amman 11191,
962-6-5827567
Kenya
Radbone-Clark Kenya Ltd., P.O. Box 40833, Nairobi-Mombasa Road, Nairobi, 2 82 12 76
Korea
Gillette Korea Ltd.
144-27 Samsung-dong,
Kangnam-ku, Seoul, Korea,
080-920-6000
Kuwait
Union Trading Co.,
Braun Service Center,
P.O. Box 28 Safat,
Safat Code 13001, Kuwait,
04 83 32 74
Latvia
Latintertehserviss Co., 72 Bullu Street, House 2, Riga 1067, 2403911
Lebanon
Magnet SAL - Fattal HLDG, P.O. Box 110-773, Beirut, ⑥ 1512002
Libya
Al-Muddy Joint-Stock Co., Istanbul Street 6, P.O. Box 4996, Tripoli, 21 333 3421
Lithuania
Elektronas AB, Kareiviu 6, 2600 Vilnius, 276 09 26
Luxembourg
Sogel S.A.,
Kind's, 287, Republic Street, Valletta VLT04, 24 71 18
Maroc
FMG
Route Principle #7 Z.I
Perchid
Casablanca, 20 000,
212 22-533033
Martinique
Decius Absalon, 23 Rue du Vieux-Chemin, 97201 Fort-de-France, 73 43 15
Mauritius
J. Kalachand & Co. Ltd., Bld DBM Industrial Estate, Stage 11, Plaine Lauzun, 2 12 84 10
Mexico
Gillette Manufactura,
S.A. de C.V./
Gillette Distribuidora,
S.A. de C.V.
Atomo No. 3
Parque Industrial Naucalpan
Naucalpan de Juarez
Estado de Mexico, C.P.
53370
01-800-508-58-00
Nederland
Netherlands Antilles
Rupchand Sons n.v. (ram's), Front Street 67, P.O. Box 79 St. Maarten, Philipsburg 052 29 31
New Zealand
Key Service Ltd., c/o SellAgence Ltd., 59-63 Druces Rd., Manakau City, Auckland, 09-262 58 35
Nippon
Gillette Japan Inc.,
Queens Tower, 13F
3-1, Minato Mirai 2-Chome
Nishi-Ku,Yokohama 220-
6013
Japan
045-680 37 00
Norge
Gillette Group Norge AS, Nils Hansensvei 4, P.O. Box 79 Bryn, 0667 Oslo, 022-72 88 10
Oman (Sultanate of)
Naranjeee Hirjee & Co., 10 Ruwi High, P.O. Box 9, Muscat 113, 703 660
Pakistan
Gillette Pakistan Ltd., Dr. Ziauddin Ahmend Road, Karachi 74200, 215688930
Paraguay
Paraguay Trading S.A., Avda. Artigas y Cacique Cara Cara, Asuncion, 21203350/48/46
Philippines
Gillette Philippines Inc., Corporate Corner
Commerce Avenues
20/F Tower 1,
IL Corporate Centre
1770 Muntinlupa city
027 71 07 02-06/-16
Poland
Gillette Poland S.A., Budynek Orion, ul. Domaniewska 41, 02-672 Warszawa, 22 548 88 88
Portugal
Grupo Gillette Portuguesa, Lda.,
Braun Service,
Rua Tomás da Fonseca,
Torre G-9°B,
1600-209 Lisboa,
808 2 000 33
Réunion
Dindar Confort,
Rte du Gymnase,
P.O. Box 278,
97940 St. Clotilde,
026 92 32 03
Romania
Gillette Romania srl.
Calea Floreasca nr. 133-137
et 1, sect 1,
71401 Bucuresti
01-2319656
Russia
RTC Sovinservice, Rusakovskaya 7, 107140 Moscow, (095) 264 96 02
Saudi Arabia
AL Naghi Company
Madinah road,
Al Baghdadia
Jeddah
Kingdom of Saudi Arabia
+9662 651 8670
Singapore (Republic of)
Beste (S) Pte. Ltd.,
6 Tagore Drive,
03-04 Tagore Industrial Building,
Singapore 787623,
45522422
Slovakia
Techno Servis Bratislava
spol. s.r.o.,
Bajzova 11/A,
82108 Bratislava,
(02) 55 56 37 49
Slovenia
Iskra Prins d.d.
Rozna dolina c. IX/6
1000 Ljubljana,
386014769800
South Africa (Republic of)
Fixnet After Sales Service,
17B Allandale Park,
P.O.Box 5716
Cnr Le Roux and Morkels
Close,
Johannesburg 1685,
Midrand, Gauteng,
113159260
St.Maarten
Ashoka,
P.O.Box 79
Philipsburg,
Netherlands Antilles,
52 29 31
St.Thomas
Boolchand's Ltd.,
31 Main Street,
P.O.Box 5667
00803 St. Thomas,
US Virgin Islands,
340 776 0302
Suomi
Gillette Group Finland Oy/
Braun,
P.O.Box 9
Niittykatu 8, PL 9,
02200 Espoo,
09-452871
Sverige
Gillette Group Sverige AB,
Dept. Sweden, Stockholm
Gillette
Rasundavagen 12,
Box 702,
16927 Solna,
020-213321
Syria
Ahmed Hadaya Company
Hadayabuilding
Ain Keresh
Unisyria, P.O. Box 35002,
Damascus,
963 011-231433
Taiwan
Audio & Electr.
Supplies Ltd.,
Brothers Bldg., 10th Floor,
85 Chung Shan N Rd.,
Sec. 1,
Taipei (104),
080221630
Thailand
Gillette Thailand Ltd.,
175 South Sathorn Road,
Tungmahamek, Sathorn,
11/1 Floor,
Sathorn City Tower
Bangkok 10520
02-3449191
Tunesie
United Arab Emirates
The New Store,
P.O.Box 3029
The Gillette Company
Braun Consumer Service, 1, Gillette Park 4k-16,
Boston, MA 02127-1096
1-800-272-8611
Venezuela
Gillette de Venezuela S.A.,
Saba Stores for Trading,
26th September Street,
P.O.Box 5278,
Taiz,
967 4-25 23 80
Yugoslavia
BG Elektronik,
Bulevar kralja Aleksandra 34,
11000 Beograd,
113240030
