Silkepil SoftPerfection 3275 - Epilator BRAUN - Free user manual and instructions

USER MANUAL Silkepil SoftPerfection 3275 BRAUN

Our products are engineered to meet the highest standards of quality, functionality and design. We hope you thoroughly enjoy using the Braun Silk-épil Soft Perfection.

Please read the use instructions carefully and thoroughly before using the appliance.

Braun Silk-épil SoftPerfection has been designed to make the removal of unwanted hair as efficient, gentle and easy as possible. Its proven epilation system removes hair at the root, leaving your skin smooth for weeks. With the innovative SoftLift® tips and the unique arrangement of tweezers it provides an extra close epilation for perfectly smooth skin, allowing to remove hairs as short as 0.5 mm as well as flat lying hairs. As the hair that re-grows is fine and soft, there will be no more stubble.

The high-precision epilation head ② comes with two different attachments:

The massaging rollers clip 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 maximum skin contact and the optimum usage position, it allows removal of even more hairs per stroke.

Warning

• Keep the appliance dry.
• Keep the appliance out of the reach of children.
• 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.
- Before use, check whether your voltage corresponds to the voltage printed on the transformer. Always use the country-specific 12 V transformer plug supplied with the product.

General information on epilation

Silk-épil is designed to epilate hair on legs, but use tests monitored by dermatologists have revealed that you can also epilate the underarm and the bikini line.

All methods of hair removal at the root can lead to in-growing hair and irritation (e.g. itching, discomfort and reddening of the skin) depending on the condition of the skin and hair.

This is a normal reaction and should quickly disappear, but may be stronger when you are removing hair at the root for the first few times or if you have sensitive skin.

If, after 36 hours, the skin still shows irritation, we recommend that you contact your physician.

In general, the skin reaction and the sensation of pain tend to diminish considerably with the repeated use of Silk-épil.

In some cases inflammation of the skin could occur when bacteria penetrate the skin (e.g. when sliding the appliance over the skin). Thorough cleaning of the epilation head before each use will minimise the risk of infection.

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.

Some useful tips

Epilation is easier and more comfortable when the hair is at the optimum length of 2-5 mm (0.08-0.2 in). If hairs are longer, we recommend that you either shave first and epilate the shorter re-growing hairs after 1 or 2 weeks.

When epilating for the first time, it is advisable to epilate in the evening, so that any possible reddening can disappear overnight. To relax the skin we recommend applying a moisture cream after epilation.

Fine hair which re-grows might not grow up to the skin surface. The regular use of massage sponges (e.g. after showering) or exfoliation peelings helps to prevent in-growing hair as the gentle scrubbing action removes the upper skin layer and fine hair can get through to the skin surface.

Description (see page 4)

1a Massaging rollers clip
EfficiencyPro clip
② Epilation head
3 Release buttons
④ Switch
⑤ Socket for cord connector
6 Cord connector
⑦ 12V transformer plug

How to epilate

• Your skin must be dry and free from grease or cream.
• Keep in mind that epilation is more comfortable when the hair is at the optimum length of 2-5 mm (see section «Some useful tips»).
  Before starting, thoroughly clean the epilation head ②
• Plug the cord connector into the socket and plug the transformer plug ⑦ into an electrical outlet.

1 To turn on the appliance, slide switch

to setting 2

2 = normal speed,

1 = reduced speed).

2 Rub your skin to lift short hairs.

For optimum performance hold the appliance at a right angle (90^) against your skin. Guide it in a slow, continuous movement without pressure against the hair growth, in the direction of the switch. The SoftLift® tips will make sure that even flat lying hair is lifted and removed thoroughly at the root.

As hair can grow in different directions, it may also be helpful to guide the appliance in different directions to achieve optimum results.

Both rollers of the massaging rollers clip should always be kept in contact with the skin in order 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 epilation head instead of the massaging rollers clip, it allows maximum skin contact and ensures optimum usage so that more hairs are removed in one stroke.

3 Leg epilation

Epilate your legs from the lower leg in an upward direction. When epilating behind the knee, keep the leg stretched out straight.

4 Underarm and bikini line epilation

Please be aware that especially at the beginning these areas are particularly sensitive to pain. With repeated usage the pain sensation will diminish. For more comfort, ensure that the hair is at the optimum length of 2-5 mm.

Before epilating, thoroughly clean the respective area to remove residue (like deodorant). Then carefully dab dry with a towel. When epilating the underarm, keep your arm raised up so that the skin is stretched and guide the appliance in different directions.

As skin may be more sensitive directly after epilation, avoid using irritating substances such as deodorants with alcohol.

Cleaning the epilation head

5 After epilating, unplug the appliance and clean the epilation head: If you have used one of the attachments a or first remove it and clean it with the brush.
6 To clean the tweezer element, use the cleaning brush dipped into alcohol. Turn the product around and clean the tweezers with the brush while turning the barrel manually.
7 Remove the epilation head by pressing 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 clip 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.

Please do not dispose of the product in the household waste at the end of its useful life. Disposal can take place at a Braun Service Centre or at appropriate collection points provided in your country.

Français

Description (cf. page 4)

Country of origin: Germany

Year of manufacture

To determine the year of manufacture, refer to the 3-digit production code

located near the type plate. 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: "535" - The product was manufactured in week 35 of 2005.

iui

1gjll g. 100
Jg j 100
Jg j 100
Jg j 100
Jg j 100
Jg j 100
Jg j 100
Jg j 100
Jg j 100
Jg j 100
Jg j 100
Jg j 100
Jg j 100
Jg j 10

$$ \cdot \mathrm {l a t}! \mathrm {j} \mathrm {o} \mathrm {d} \mathrm {i} \mathrm {a l l} \mathrm {a} \mathrm {a l l} $$

$$ \left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right. $$

$$ \hat {c}: J _ {g a s} \downarrow \frac {3}{2} \bar {a} _ {g a i l} \downarrow \downarrow $$

$$ \therefore \text {d} \left(\frac {1}{2}\right) = \frac {1}{2} \cdot \frac {1}{2} \cdot \frac {1}{2} \cdot \frac {1}{2} \cdot \frac {1}{2} \cdot \frac {1}{2} $$

$$ l a s i n g \left{e ^ {j} \right} $$

$$ \therefore \text {L} _ {\text {R}} \text {L} _ {\text {R}} \text {L} _ {\text {R}} \text {L} _ {\text {R}} \text {L} _ {\text {R}} \text {L} _ {\text {R}} \text {L} _ {\text {R}} \text {L} _ {\text {R}} \text {L} _ {\text {R}} \text {L} _ {\text {R}} $$

$$ \left. \right| \left. \right| \left. \right| \left. \right| \left. \right| \left. \right| \left. \right| \left. \right| \left. \right| \left. \right| \left. \right| \left. \right| \left. \right| \left. \right| \left. \right| \left. \right| \left. \right| \left. \left. \right| \right| \left. \right| \left. \right| \left. \right| \left. \right| \left. \right| \left. \right| \left. \right| \left. \right| \left. \right| \left. \right| \left. \right| \left. \right| \left. \right| \left. \right| \left. \right| \left. \right| 1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 2 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 8 $$

$$ E M C 8 9 / 3 3 6 / E E C $$

$$ . 7 3 / 2 3 E E C \dots $$

$$ j a n d l i g i j l i j i j i i i i i i $$

$$ \therefore \text {a l i s t i n g} (1) \text {a l i s t i n g} (2) $$

$$ . \text {U} \text {U} \text {U} \text {U} \text {U} \text {U} \text {U} \text {U} \text {U} \text {U} \text {U} \text {U} \text {U} \text {U} \text {U} \text {U} \text {U} \text {U} \text {U} \text {U} \text {U}. $$

$$ j _ {i} = \left{ \begin{array}{l l} 1 & j _ {i} = 0 \ 2 & j _ {i} = 1, j _ {i + 1} = 2, j _ {i + 2} = 3, \dots , j _ {i + n - 1} = n \end{array} \right. $$

$$ \dot {s} \dot {s} \dot {s} \dot {s} \dot {s} \dot {s} \dot {s} \dot {s} \dot {s} \dot {s} \dot {s} \dot {s} $$

$$ . \dot {a} \dot {a} \dot {a} \dot {a} \dot {a} \dot {a} \dot {a} \dot {a} \dot {a} \dot {a} \dot {a} \dot {a} \dot {a} \dot {a} $$

$$ \mathrm {s i l l} \quad \mathrm {s i l l} \quad \mathrm {s i l l} \quad \mathrm {s i l l} \quad \mathrm {s i l l} \quad \mathrm {s i l l} \quad \mathrm {s i l l} $$

$$ . \ddot {a} _ {i j} L _ {i j} k _ {i j} ① b, i ① a _ {i j} L _ {i j} $$

$$ \therefore \text {b y} \left[ \begin{array}{l l l l l} \end{array} \right] \text {c r i t} \left[ \begin{array}{l l l l l} \end{array} \right] $$

$$ \ddot {a} \omega L \dot {L} \dot {L} \dot {L} \dot {L} \dot {L} \dot {L} \dot {L} \dot {L} \dot {L} $$

$$ \therefore \left| \omega_ {1} \right| = \frac {\pi}{2} \omega_ {1} ^ {2} + \frac {\pi}{2} \omega_ {1} ^ {2} - 4 \cos \theta $$

$$ \ddot {g} b l l o i n \dot {i} \dot {c} \dot {s} \dot {e} \dot {f} \dot {l} \dot {a} \dot {s} $$

$$ \cdot \left| \frac {1}{2} \right| = \frac {1}{2} \times 1 = \frac {1}{2} $$

$$ \therefore \text {i} \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow $$

$$ \left. \int_ {0} ^ {1} \int_ {0} ^ {1} \int_ {0} ^ {1} \int_ {0} ^ {1} \int_ {0} ^ {1} \int_ {0} ^ {1} \int_ {0} ^ {1} \int_ {0} ^ {1} \int_ {0} ^ {1} \int_ {0} ^ {1} \int_ {0} ^ {1}\right) $$

$$ \therefore \sin 5 0 ^ {\circ} - 1 \approx 2 $$

$$ \ddot {a} \dot {b} \dot {b} \dot {d} \dot {l} \dot {u} \dot {j} \dot {g} \dot {b} \dot {j} \dot {r} \dot {s} \dot {e} \dot {j} \dot {j} $$

$$ \left. \int_ {0} ^ {1} f (x) d x \right| _ {0} ^ {\infty} $$

$$ l _ {i j} = l _ {i j} \cdot i \cdot j. (j, j) $$

$$ \therefore \text {e x i s t} \quad \omega . $$

$$ \ddot {c} \dot {c} \dot {c} \dot {c} \dot {c} \dot {c} \dot {c} \dot {c} \dot {c} \dot {c} \dot {c} \dot {c} \dot {c} \dot {c} \dot {c} $$

$$ j _ {i j} \frac {1}{2} \sum_ {i = 1} ^ {n} \sum_ {j = 1} ^ {m} \sum_ {k = 1} ^ {n} \sum_ {l = 1} ^ {m} $$

$$ . \dot {a} \dot {a} \dot {a} \dot {a} \dot {a} \dot {a} \dot {a} \dot {a} $$

$$ \therefore \lim _ {n \rightarrow \infty} \frac {1}{n ^ {2}} = \frac {1}{n ^ {2}} $$

$$ J _ {a a a} \left[ \begin{array}{l l l l l l} \end{array} \right] $$

$$ \ddot {q} \dot {r} \dot {a} \dot {s} \dot {l}, \quad \dot {c} \dot {x} \dot {y} \dot {z} \dot {u} \dot {v} \dot {w} \dot {d} \dot {l} \dot {g} \dot {l} $$

$$ . \cup_ {s} S _ {1} \cup_ {s} S _ {2} \cup_ {s} ^ {\prime} $$

$$ \mathrm {r a n s l e} \in {1, 2, \dots , n } $$

$$ j _ {i} = \left{ \begin{array}{l l} j _ {i} + 1 & j _ {i} \leqslant j _ {i - 1} \ j _ {i} + 1 & j _ {i} > j _ {i - 1} \end{array} \right. $$

$$ \therefore \text {x} _ {0} = \frac {\pi}{2}, \text {y} = \frac {\pi}{4}, $$

$$ \left. \int_ {a} ^ {b} f (x) d x + \int_ {a} ^ {b} g (x) d x\right) = 0 $$

$$ \cdot \rho (\dot {x} \dot {z} \dot {w}) \dot {x} \dot {a} \dot {w} \dot {o}, $$

$$ i \Delta_ {j} j _ {1} j _ {2} j _ {3} j _ {4} j _ {5} j _ {6} j _ {7} j _ {8} j _ {9} j _ {1 0} j _ {1 1} j _ {1 2} j _ {1 3} j _ {1 4} j _ {1 5} j _ {1 6} j _ {1 7} j _ {1 8} $$

$$ j _ {i} \left\lvert \right\rvert j _ {i} \left\lvert \right. \left. \right\rvert j _ {i} \left\lvert \right. \left. \right\rvert j _ {i} \left\lvert \right. \left. \right\rvert j _ {i} $$

$$ \therefore \text {i s} \text {i} \text {i} \text {i} \text {i} \text {i} \text {i} \text {i} \text {i} \text {i} \text {i} \text {i} \text {i} \text {i} \text {i} \text {i} $$

$$ \ddot {e} g _ {i j k l} \dot {s} _ {j} \dot {s} _ {k} \dot {s} _ {l} \ddot {a} _ {i} \ddot {s} _ {j} \ddot {a} _ {k} \ddot {a} _ {l}. $$

$$ \cdot \ddot {a} \dot {a} \dot {a} \dot {a} \dot {a} $$

j

i

.

1

. ②

⑥

⑦ 1

.

① a

16

4

. 2

（20 空 一 一 一 一 一 一 = 一 2 一

（a）=（1

-

a 1

（）

s

111 1

.

a

J 1

cLl 3 aoll oir.

JUULI JUSS

.

i j 1

1X.

y

（p：

aillg 1e lcly

aI 1

J 1

.

(4 aio jai) jao

1a

y

1 ②

Jai j

C ④

山

山

17_2^1 ⑦

J.（）

1 1 1 1 1 1 1 1 1 1 1 1 1 1 1

J 1000000000000000000000000000000000000000000000000

.111 1 aL11 Jgabll -
Jyss c0ybll acln olaiz
o 111 .s:J21
.2
.111 (jcl) jz

Jg Jg 10000000000000000000000000000000000000000000000000000

J 1 J 1 J 1 J 1 J 1 J 1 J 1 J 1 J 1 J 1 J 1 J 1 J 1 J 1 J 1 J 1 J 1 J 1 J 1 J 1 J 1 J 1 J 1 J 1 J 1 J 1 J 1 J 1 J 1 J 1 J 1 J 1 J 1 J 1 J

ailll laii
L 15, JrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJrJr

1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1

8

（）

i

.

1b

aai jie 1e, eai Iy, Ij

（p）

1

S_5 = 53

e gaii i jia aie

aai

i Jol. aal,

J-

Braun Silk-epil)

. (SoftPerfection

y

jL11ie p1i=1j

#

.

Jliu juiyj1

.

jll b1y j（y）y

yol

.

i 1

aJgall aalg 1

1 1

1

1 1

-1-

1

cL<ll, 1, 1, 1, 1, 1, 1, 1, 1

1

e 1

L

K! bXuJ 1

.

i 1

1 1

.

②

：山

jJgss 15s sS yEMC89/336/EEC

(73/23 EEC)

.

1b ①a

0

1

10 9

.

051111 1

.

#

j

·

a

sla 51.0K=ssgK,glaij

j1 1

（）

.

cL0 1

jui jie

sllol ola jglg

（）

（）

，sla 5gai ，（

3.

jie jie 1

1

（J）

1

J 1

S OBC = S COD + S BOC - S BOD

1j 1r j

y1y 1 y

2gaoab 1

（a）

.①b

.

$$ \left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right. $$

$$ \left. \int_ {0} ^ {1} \int_ {0} ^ {1} \int_ {0} ^ {1} \int_ {0} ^ {1} \int_ {0} ^ {1} \int_ {0} ^ {1} \int_ {0} ^ {1} \int_ {0} ^ {1} \int_ {0} ^ {1} \int_ {0} ^ {1} \int_ {0} ^ {1}\right) $$

$$ l _ {1} \cdot \dots \dots \dots \dots \dots \dots \dots \dots \dots \dots \dots \dots $$

$$ \left.\right| _ {0} ^ {\infty} \rightarrow \infty , \quad \left| _ {1} ^ {\infty} \right| = 1, $$

$$ i i d o \cdot j i d o \cdot s l. s l. s l. $$

$$ \therefore \text {i n} \left[ \begin{array}{l l l l l l l} \end{array} \right] $$

$$ . d a l y \quad j _ {a} \quad L _ {a} \quad 0 - r \quad s \quad d i l y $$

$$ j _ {i} \quad j _ {i} \quad j _ {i} \quad j _ {i} \quad j _ {i} $$

$$ c b \sim s, s \geq l \therefore s \geq x _ {0} k 1, $$

$$ \left(\left(\frac {1}{2} \right) \frac {1}{2} \frac {1}{2} \frac {1}{2}\right) \frac {1}{2} \frac {1}{2} \frac {1}{2} \frac {1}{2} $$

$$ \therefore \cos \angle A B C = 1 $$

$$ \therefore \text {i n} \left[ \begin{array}{l l l l l l} \frac {1}{2} & 0 & 0 & 0 & 0 & 0 \ 0 & 0 & 0 & 0 & 0 & 0 \ 0 & 0 & 0 & 0 & 0 & 0 \end{array} \right] $$

$$ \left. \left. \right| _ {1} \right| _ {2} \left| _ {3} \right| _ {4} \left| _ {5} \right| _ {6} \left| _ {7} \right| _ {8} \left| _ {9} \right| _ {1 0} $$

$$ \Delta \cdot \Delta \cdot \Delta \cdot \Delta \cdot \Delta \cdot \Delta \cdot \Delta \cdot \Delta \cdot \Delta \cdot \Delta \cdot \Delta \cdot \Delta \cdot \Delta \cdot \Delta \cdot \Delta \cdot \Delta \cdot \Delta \cdot \Delta $$

$$ \therefore \omega = \frac {1}{2} \omega_ {1} - \frac {1}{2} \omega_ {2} $$

$$ \therefore S $$

$$ \left. \dots \right| j | j | $$

$$ j \downarrow \downarrow j _ {i} ^ {\prime} \downarrow \downarrow j _ {i} ^ {\prime} $$

$$ \therefore \text {d i s t a t e} \quad \text {d i s t a t e} \quad \text {d i s t a t e} \quad \text {d i s t a t e} \quad \text {d i s t a t e} \quad \text {d i s t a t e} $$

$$ \therefore \text {l a i s} \circ \text {s l i s} \cup \cup \cup \cup \cup \cup \cup \cup \cup \cup \cup $$

$$ \left. \right\rvert \text {g} \left. \right\rvert \text {s l} \sim \dots \text {l} $$

$$ \left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right. $$

$$ \vert \downarrow \downarrow \vert \circ \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow $$

$$ \therefore \text {i} \leqslant \text {i} \leqslant \text {i} \leqslant \text {i} \leqslant \text {i} \leqslant \text {i} \leqslant \text {i} \leqslant \text {i} \leqslant \text {i} \leqslant \text {i} \leqslant \text {i} \leqslants $$

$$ \therefore \text {R} = \sum_ {i = 1} ^ {n} \sum_ {j = 1} ^ {m} \sum_ {k = 1} ^ {n} \sum_ {l = 1} ^ {m} $$

$$ \therefore \therefore S = \frac {1}{2} a b $$

$$ \mathrm {S L a g e} \rightarrow \text {S o f t L i f t} ^ {\circ} \mathrm {S L a g e} $$

$$ \left. \right.\left. \right.\left. \right.\left. \right.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right. $$

$$ \left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right. $$

$$ \therefore \text {i} _ {1} \text {i} _ {2} \text {i} _ {3} \text {i} _ {4} \text {i} _ {5} \text {i} _ {6} \text {i} _ {7} \text {i} _ {8} \text {i} _ {9} \text {i} _ {1 0} $$

$$ s l _ {i} = \sum_ {j} 1. 0 k _ {i j} \omega_ {i j} \omega_ {i j} $$

$$ l o, j l o, l o, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, j, $$

$$ . (1 a) $$

$$ L _ {i} \equiv L _ {i} \equiv L _ {i} \equiv L _ {i} \equiv L _ {i} $$

$$ 0. 0 1 \dot {s} \dot {s} \dot {s} \dot {s} \dot {s} \dot {s} \dot {s} \dot {s} \dot {s} \dot {s} $$

$$ \left. \right.\left. \right.\left. \right.\left. \right.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right. $$

$$ \therefore \left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left. 1 0 0 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 5 4 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . \right. = \right. = \right. = \right. = \right. = \right. = \right. = \right. = \right. = \right. = \right. = \right. = \right. = $$

$$ \left. \int_ {0} ^ {\infty} \frac {1}{x ^ {2}} \right| _ {0} ^ {\infty} \frac {1}{x ^ {2}} $$

$$ , E f f i c i e n c y P r o c l i p \quad a b c d \quad \dots \dots $$

$$ \therefore 1. \quad \text {d i s} \quad \text {s a n} \quad \text {k} \quad \text {s} \quad \text {s} \quad \text {s} \quad \text {s} \quad \text {s} \quad \text {s} \quad \text {s} \quad \text {s} \quad \text {s} \quad \text {s} \quad \text {s} \quad \text {s} \quad \text {s} \quad \text {s} \quad \text {s} $$

$$ \therefore \omega_ {1} = \omega_ {2} = \omega_ {3} = \omega_ {4} = \omega_ {5} = \omega_ {6} = \omega_ {7} = \omega_ {8} = \omega_ {9} = \omega_ {1 0} $$

$$ . 2, \sqrt [ 3 ]{5} + 1, \frac {1}{2}, \dots , \frac {1}{2}, \dots , \frac {1}{2}, \dots , $$

$$ \downarrow \dot {c} \dot {c} \dot {c} \dot {c} \dot {c} \dot {c} \dot {c} \dot {c} \dot {c} \dot {c} \dot {c} \dot {c} \dot {c} \dot {c} \dot {c} \dot {c} $$

$$ x _ {1} \neq \sum_ {i = 1} ^ {n} i + j, s _ {1} \neq s _ {2} $$

$$ \therefore \text {g} \cdot \text {x} \cdot \text {y} \cdot \text {z} \cdot \text {s} \cdot \text {t} \cdot \text {w} \cdot \text {x} \cdot \text {y} $$

$$ \therefore \text {l o l} \text {s i g s l a l y} (\text {g i}) $$

$$ \therefore \angle 1 = \angle 2 $$

$$ \sim b l \cdot j 1 s l \cdot c s _ {s} ⑤ $$

$$ \dots \tag {6} $$

$$ \therefore 1 7, 2 3, 2 4, 2 5 \tag {⑦} $$

iSgX1g

jS,

.

51

20 1

②

（）

J ⑦

1a

Lb

④

$$ \therefore \text {i} \leqslant 2 \times \text {c} \leqslant 0, 1 $$

$$ \left(j _ {0} j \dots e _ {r r} = \ll 2 \gg\right) $$

$$ . (1 5 5) \therefore c _ {n} = \ll 1 $$

slo 1

y1s.

k1 = 32,k2 = - 32

1

j1 jss 2xol | lgo |

.

15

J 1

1s

15

015 1

.

cui 1

yL

slaoljdo

（）

eLo,（1）S

2gSgogxslgo

(4aio y aol)

1a

EfficiencyPro clip ⑥

J ②

( 4) S = a_i

4

$$ \begin{array}{l} \text {a} \left(\right) \text {d} \left(\right) \text {d} \left(\right) \text {d} \left(\right) \text {d} \left(\right) \text {d} \left(\right) \ \therefore \text {i} _ {1} \text {i} _ {2} \text {i} _ {3} \text {i} _ {4} \text {i} _ {5} \text {i} _ {6} \text {i} _ {7} \text {i} _ {8} \text {i} _ {9} \text {i} _ {1 0} \ \therefore \text {i n} \left[ \begin{array}{l l l l l l} \end{array} \right] \ \end{array} $$

$$ \begin{array}{l} j 1 o s l a e \dots 1 2, g o, j 5 \leq i g s, j L \leq j 5 \ \therefore \sum_ {i = 1} ^ {n} a _ {i} = \sum_ {i = 1} ^ {n} a _ {i} \ \therefore \therefore \therefore \therefore \ \end{array} $$

$$ \begin{array}{l} j _ {1} \text {a} _ {2} \text {b} _ {3} \text {c} _ {4} \text {d} _ {5} \text {e} _ {6} \text {f} _ {7} \text {g} _ {8} \text {h} _ {9} \ o l e \dots o k \dots j 1 2 g \dots s a y \downarrow c o r n \ \therefore \Delta S C E \sim \Delta \ S _ {1} = \left{L _ {1}, L _ {2}, \dots , L _ {n} \right} \ (g \cdot i s s \rightarrow s l o o d) \cdot o l e \cdot g \ \omega_ {i} \omega_ {j} \ \ddot {s} \dot {s} \dot {s} J \dot {s} \dot {s} J \dot {s} 1 - \ \left(\dots \right. \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \ \left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right. \ \dot {S} \left| \begin{array}{l l l l l l} \end{array} \right| = 0. 5 \ \end{array} $$

$$ \begin{array}{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. \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. \text {一} _ {j} ^ {j} : j _ {j} ^ {j} : j _ {j} ^ {j} : j _ {j} ^ {j} : j _ {j} ^ {j} : j _ {j} ^ {j} : j _ {j} ^ {j} : j _ {j} ^ {j} : j _ {j} ^ {j} : j _ {j} ^ {j} : j _ {j} ^ {j} : \right| _ {j} ^ {j} : j _ {j} ^ {j} : j _ {j} ^ {j} : j _ {j} ^ {j} : j _ {j} ^ {j} : j _ {j} ^ {j} : j _ {j} ^ {j} : j _ {j} ^ {j} : j _ {j} ^ {j} : j _ {j} ^ {j} : 1 _ {j} ^ {j} : 1 _ {j} ^ {j} : 1 _ {j} ^ {j} : 1 _ {j} ^ {j} : 1 _ {j} ^ {j} : 1 _ {j} ^ {j} : 1 _ {j} ^ {j} : 1 _ {j} ^ {j} : 1 _ {j} ^ {j} : 1_{j} ^ {j}\right)\right| _ {j} ^ {j}\right)\right| _ {j} ^ {j}\right)\right| _ {\cdot} \right| \ \text {a} \left(\right) \text {d} \left(\right) \text {d} \left(\right) \text {d} \left(\right) \text {d} \left(\right) \text {d} \left(\right) \ \therefore \text {i} _ {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 {i n} \left[ \begin{array}{l l l l l l} \end{array} \right] \ j 1 o s l a e \dots 1 2, g o, j 5 \leq i g s, j L \leq j 5 \ \therefore \sum_ {i = 1} ^ {n} a _ {i} = \sum_ {i = 1} ^ {n} a _ {i} \ \therefore \therefore \therefore \therefore \ j _ {1} \text {a} _ {2} \text {b} _ {3} \text {c} _ {4} \text {d} _ {5} \text {e} _ {6} \text {f} _ {7} \text {g} _ {8} \text {h} _ {9} \ o l e \dots o k \dots j 1 2 g \dots s a y \downarrow c o r n \ \therefore \Delta S C E \sim \Delta \ S _ {1} = \left{L _ {1}, L _ {2}, \dots , L _ {n} \right} \ (g \cdot i s s \rightarrow s l o o d) \cdot o l e \cdot g \ \omega_ {i} \omega_ {j} \ \ddot {s} \dot {s} \dot {s} J \dot {s} \dot {s} J \dot {s} 1 - \ \left(\dots \right. \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \ \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. \ \dot {S} \left| \begin{array}{l l l l l l} \end{array} \right| = 0. 5 \ \therefore \therefore \therefore \therefore \ j _ {2} \log_ {2} 5 \dots 1 \uparrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \ \mathcal {S} 1. \text {d i s c l} \text {j i n} \text {j e t} \text {D - r a d} \text {c l} \text {w o} \text {o j} \text {d i l} \ \Delta \leqslant 1 \text {以} 1 \text {以} \text {以} \text {以} \text {以} \text {以} \text {以} \text {以} \text {以} \text {以} \text {以} \text {以} \text {以} \text {以} \text {以} \ \therefore \omega_ {x} = 1, \omega_ {y} = 0, \omega_ {z} = 0 \ \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow \downarrow - \downarrow \downarrow \ \therefore \lim _ {y \rightarrow - \infty} \frac {1}{y ^ {2}} \ \cos \angle A B C = \frac {1}{2} \sin^ {2} \alpha + \frac {1}{2} \cos^ {2} \alpha \ \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 S _ {0} = \sin \alpha - 1 + j 1 j j j j l \ \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} \frac {\sqrt {3}}{2}\right) \ \therefore \int_ {0} ^ {\infty} \int_ {0} ^ {\infty} \int_ {0} ^ {\infty} \int_ {0} ^ {\infty} \int_ {0} ^ {\infty} \int_ {0} ^ {\infty} \ (\hat {s} \hat {s} J _ {1 0} s) \hat {s} s \hat {s} \hat {s} \ \therefore \left(\sum_ {i = 1} ^ {n} a _ {i} + \sum_ {i = 1} ^ {n} b _ {i}\right) = \sum_ {i = 1} ^ {n} a _ {i} + \sum_ {i = 1} ^ {n} b _ {i} \ \leqslant \sum_ {i = 1} ^ {n} \sum_ {j = 1} ^ {m} \sum_ {l = 1} ^ {n} \sum_ {i, j = 1} ^ {m} \ \rightarrow \rightarrow \rightarrow \rightarrow \rightarrow \rightarrow \rightarrow \rightarrow \rightarrow \rightarrow \rightarrow \rightarrow \rightarrow \rightarrow \rightarrow \rightarrow \rightarrow \rightarrow \rightarrow \rightarrow \rightarrow \rightarrow \ \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.\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, 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 \right]\right]\left. \right] = 1 - 1 - 1 - 1 - 1 - 1 - 1 - 1 - 1 - 1 - 1 - 1 - 1 - 1 - 1 - 1 - 1 - 1 - 1 - 1 - 1 - 1 - 1 - 1 - 1 - 1 - 1 - 1 - 1 - \ \therefore \Delta B D S \ l \hat {w} \quad \text {s w i t h} \quad l \hat {w} \quad \text {c o n v e c l} \quad 1 9 j 1 \quad \text {d r}, \quad 5 1 \ \therefore \left. \frac {1}{2} \right| _ {0} ^ {\infty} \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} \ o l a = \left{L _ {0} \right} \ \ddot {S} \rightarrow S _ {1} \dot {S} \dot {S} \dot {S} _ {1}, \quad J _ {1} - \dot {S} L _ {1} \dot {J} _ {1}, \dot {S} _ {0} \ \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 \Delta L _ {1} S = 8 \ \dot {z} \left[ \begin{array}{l l l l l l l} \dot {s} & \dot {s} & \dot {s} & \dot {s} & \dot {s} & \dot {s} & \dot {s} \ \dot {r} & \dot {r} & \dot {r} & \dot {r} & \dot {r} & \dot {r} & \dot {r} \end{array} \right] \ \therefore \lim _ {x \rightarrow - \infty} \frac {\log_ {1 0} x}{\log_ {1 0} x} = \frac {\log_ {1 0} x}{\log_ {1 0} x} \ \end{array} $$

$$ \begin{array}{l} : \Delta L _ {1} S l _ {2} \leq 4 a b \overline {{a}} + 3 d r ^ {2} + \ \ddot {x} \dot {y} \dot {z} \dot {w} \dot {u} \dot {v} \dot {w} \dot {x} \dot {y} \dot {z} \dot {w} \dot {u} \dot {v} \dot {w} \dot {x} \dot {y} \dot {z} \dot {w} \dot {u} \dot {v} \dot {w} \dot {x} \dot {y} \dot {z} \ \therefore \mathrm {d} l = 0, \mathrm {d} \theta = \frac {\mathrm {d}}{\mathrm {d} t} \mathrm {d} x = 0. \ \cos \sin \cos \sin \cos \sin \cos \sin \cos \sin \cos \sin \cos \sin \cos \sin \cos \sin \cos \sin \cos \sin \cos \sin \cos \ j _ {1} \rightarrow j _ {2} \rightarrow j _ {3} \rightarrow j _ {4} \rightarrow j _ {5} \rightarrow j _ {6}, \ \therefore \hat {S} = \hat {S} \ \dot {s} \omega_ {\mathrm {s}} \text {E f f i c i e n c y P r o c l i p} \quad \text {d} \quad \text {d} \quad \text {d} \ . \therefore \lim _ {k \rightarrow \infty} \frac {1}{k ^ {2}} \left| \frac {1}{k ^ {2}} \right| = 0 \ \left. \right} \text {a d} \left. \right} \text {i n} \left. \right} \text {i n} \left. \right} \text {i n} \left. \right} \ \therefore \sum_ {j = 1} ^ {n} \sum_ {i = 1} ^ {m} \sum_ {j = 1} ^ {n - i} \sum_ {k = 1} ^ {m - j} \sum_ {l = 1} ^ {n - k} \dots \ . 2 1 3, 5 x \ \end{array} $$

#

$$ \begin{array}{l} \therefore \overrightarrow {S} = \overrightarrow {S _ {1}} + \overrightarrow {S _ {2}} \ \therefore \angle 1 = \angle 2 \ \end{array} $$

$$ \therefore \lim _ {x \to 0} \frac {1}{x ^ {2}} + \frac {1}{x ^ {3}} + \dots + \frac {1}{x ^ {n}} $$

$$ \begin{array}{l} \left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right. \ \therefore \left| \frac {1}{2} \right| = \frac {1}{2} \ \therefore \text {L} _ {\text {R}} \text {R} _ {\text {R}} \text {R} _ {\text {R}} \sim \text {S} _ {\text {S}} \text {S} _ {\text {S}} \text {L} _ {\text {L}} \text {T} _ {\text {T}} \text {L} _ {\text {L}} \ \therefore \lim _ {g \to 0} \frac {1}{g ^ {2}} = \frac {1}{g ^ {2}} \ o k = \cos \alpha + \sin \alpha + \cos \alpha + \sin \alpha + \cos \alpha + \sin \alpha + \cos \alpha + \sin \alpha + \cos \alpha + \sin \alpha + \cos \alpha + \sin \alpha + \cos \alpha + \sin \alpha + \cos \alpha + \sin \alpha + \cos \alpha + \sin \alpha + \cos \alpha + \sin \alpha + \cos \alpha + \sin \alpha \ \end{array} $$

$$ \begin{array}{l} \therefore \quad \text {d} _ {\text {i}} \text {d} _ {\text {i}} \text {d} _ {\text {i}} \text {d} _ {\text {i}} \text {d} _ {\text {i}} \text {d} _ {\text {i}} \text {d} _ {\text {i}} \text {d} _ {\text {i}} \ \left. \int_ {S} \omega_ {1} \omega_ {2} \dots \omega_ {n} \right\rvert \omega_ {1} \omega_ {2} \dots \omega_ {n} \ o o l \dots 1 \dots 1 o k \dots 0. 5 (o o l \dots 1 \ \end{array} $$

$$ \therefore \Delta = 0 $$

$$ \begin{array}{l} 2 b + 5 0, 8 \cdot \dot {s} \dot {b} \dot {j} j L _ {0} = y _ {g a s} \ . 2 5 1 2 3 4 2 3 4 2 3 4 2 3 4 2 3 4 2 3 4 2 3 4 2 3 4 2 3 4 2 3 4 \ - \sqrt {2} \omega_ {1} \omega_ {2} \omega_ {3} \omega_ {4} \omega_ {5} \omega_ {6} \omega_ {7} \omega_ {8} \omega_ {9} \omega_ {1 0} \ . \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \ \end{array} $$

$$ \begin{array}{l} \left. \cdot \cdot \cdot \right| _ {i} ^ {j} \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \cdot \ \cos \left| \frac {1}{2} \right|, \sqrt {3}, k; j, b, j _ {\text {a l l}}, j _ {\text {a l l}} \ \therefore \frac {1}{2} x - 1 > 3 - \frac {3}{2} x \ \end{array} $$

$$ \begin{array}{l} \text {S} \text {S} \text {S} \text {S} \text {S} \text {S} \text {S} \text {S} \text {S} \text {S} \text {S} \text {S} \text {S} \text {S} \text {S} \text {S} \text {S} \text {S} \text {S} \text {S} \text {S} \ \left[ \begin{array}{l l l l} l & l & \omega_ {1} & \omega_ {2} \ \omega_ {1} & \omega_ {2} & \omega_ {3} & \omega_ {4} \end{array} \right] = \left[ \begin{array}{l l l l} 0 & 0 & 0 & 0 \ 0 & 0 & 0 & 0 \ 0 & 0 & 0 & 0 \ 0 & 0 & 0 & 0 \end{array} \right] \ \therefore \therefore S _ {S} = \int_ {0} ^ {1} \frac {1}{x} d x, \therefore S _ {S} = \int_ {0} ^ {1} \frac {1}{y} d y \ j \mid j \log_ {2} 0. 5 \ l a s i n g \ . 3 1 \dot {s} \dot {s} s \dot {s} \dot {s} \ \circ \dot {S} \left. \right| _ {\rho} \circ \text {S o f t L i f t} ^ {\circ} \sim \left. \circ \right| _ {\rho} \ \left. \frac {1}{2} \right| _ {0} ^ {\infty} \frac {1}{2} \frac {1}{2} \frac {1}{2} \frac {1}{2} \frac {1}{2} \frac {1}{2} \frac {1}{2} \ \left. \right.\left. \right.\left. \right.\left. \right.\left. \right.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\left.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right.\right. \ \therefore \lim _ {x \to 0} \frac {\sin^ {2} x}{\cos^ {2} x} = \frac {1}{3} \ \therefore \left(\because \Delta = \Delta - 2, \Delta = \Delta + 2\right) \cdot \Delta = \Delta + 2 \ \Delta \omega_ {i} = \omega_ {i} + \Delta \omega_ {i} ^ {\prime} \ \dots \text {的} \dots \text {的} \dots \text {的} \dots \text {的} \dots \text {的} \dots \text {的} \dots \text {的} \ \end{array} $$

$$ \downarrow s l a g o j i d e s s ② $$

$$ \cos \beta \sin \gamma $$

Deutsch

Garantie

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

Bce npyrne Tpe6oBaHn, BKJIIOUaTpe6oBaHn BO3MeIeHn y6bITKOB, NCKJIIOuAOTc, ecn Ha7aOTBeTCTBeHHOCTb He yCTaHOBJIeHa B3aKOHHom nopJKe.

PeklaMaun, Cb3aHhIe c KOMMepueckm KOHTpaKTom C npOaBcM He nOaIaOT noI 3Tu rapaHTnIO.

B COOTBeTCTBnC 3aKoHOM PNo 2300-1 ot7.02.1992r. «O 3aUnte npab NOTpe6HTeJeN» n npnHaTbIM DOONHeHem K 3aKoHy P0 ot 9.01.1996 r. «OBHeceHHn H3MeHEnN» n DOONHeHn B 3aKOH «O 3aUnte npab NOTpe6HTeJeN» n «KoJekPCΦCP o6 aAMnHnCTpaTHBbIX npaBOHApUSeHnX», φnpMa BRAUN yctaHaBnBaet cpoK Cnyx6bl Ha CBOH N3deJIyraPBbIM DByM Roam C MOMENTa npHO6peTeHnY nIi C MOMENTa IPOH3BOIDCTBa, ecIi DaTy npOJaXu YCTaHOBnTB HeBO3MOxHO. IV3dJIyA BRAUN n3rOToBJeHbIB COOTBeTCTBnC BBICOKHM Tpe6OBaHnMn EBPoneckoro KaueCTBa. Ppi 6epeXHom nCnoJIb3OBAHN i npi Co6JIIODeHn npaBN IIO 3KcPlyaTaUIn, npHO6peTeHnEe Bamn n3dJIne φnpMb BRAUN, MoKeT nMeTb 3NaHTeNbHO BoIbShn CpOK cnX6bl, qem CpOK yCTaHOBHeHHbI B COOTBeTCTBnC PoCCnCKm 3aKoHOM.

CnyuH,Ha KOTOpbIe rapaHTnH He pacnpocTpaHHeTcH:

-DepeKtbl,Bbl3BaHHbIeΦopc-MaxkopHbIMN O6CTOaTeNbCTB
-ИСПОЛьЗOBаHнeВпрофecсноHaJIbHbIX Zeлax;
- HapyuheHne Tpe6oBaHn INHCTpyKcHn NO 3KcnpLyatau;
-He npabaBnIbHa yCTaHOBka HapjKeHna HTaIOUeN cETn (ecnn 3TO Tpe6yEtca);
-BHeceHHeTexHnueCKNX N3MeHeHn;
-MexaHnueckne NOBpeKdEHHra;
- NOBpeKdEHHa NO BnHe XHBOTHbIX, rpb3yHOB n HaceKOMbIX (B TOM YnCJIe ClyuAn HaxOxJdeHnra rpb3yHOB n HaceKOMbIX BHyTpni np6OpOB);
-ДлЯ пиборов, pa6oTaIOUx OTO 6aTapeeK,-pa6Ota c HeNoDxOJaUIMN IJIH nCTOUsEHHbIMN 6aTapeiKaMn, IIO6bIe NOBpeXdEHNr, Bbl3BaHHbIe

NCTOUeHHbIMN JIITeKyUIMN

6aTapeiKamn (coBetyeM

TIOJIb3OBaTbcra TOJIbKO

IpeOxpaHeHHbIMN OT BblTeKaHn8 6aTapeiKamn);

Bci iHsi BmOrn, pa30m 3 BmOramn BiDxKOdyBaHHra 36ntKIB, He diiChi, KaO HaHa BiIOBdaIbHiCTb He BCTaHOBHeHa 3aKOHHM YINOM.

BnnaKn,Ha kI He po3noBcIOJxUyE Tbca rapaHTi:

-ДeФeKTN,ВИКЛиКаHIФОрС-МaЖОрнIMN OБсТаВиHAMN;
—BVKOPINCTaHH3 npocceiHOIO MeTOIO;
- NopyuWeHnBnMOr iNcTpkyKcii 3 ekCnIyataci;
-HeBipHe BCTaHOBJIeHHHaNPyRIMepexKi XINBJIeHHra（KUo UeBMaraTbcra);
- 3ДиСЕнгТexHicHyNx 3MiH;
-MexaHHiN0uKoJxHeHHra;
-ДЯпнадiВ,иО npaцIOIbHa 6aTapeKax -po6Ota 3 HeBIDNoBIHnMn a6o cnpaцBOBaHnMn 6aTapeKaMn,6yDbIki NOsKOJKeHn,BNKInKaHi cnpaцBOBaHnMn a6o NiITiKaIOUHMn 6aTapeKamn;
-ДЯбпТВ-3IM'Ятtaabo npBaHa ciTka.

Y BnnaKy BnHKHeHncklaIHOuB 3 BnKoHaHHr rapaHTiHoro a60 nicraRapaHTiHoro o6cnyroByBaHH npoxaHH 3BePtaTncb Do cepBicHoro ueHTpy fipMn Braun BV KpaIHi.