SB054 - Blender KENWOOD - Free user manual and instructions

USER MANUAL SB054 KENWOOD

You can use your Smoothie Blender for making delicious and nutritious cold drinks. The dispensing lid means that the goblot can easily be converted into a travel mug.

A selection of recipes can be found at the back of the instructions, and the handy markings on the mug allow you to mix ingredients of your choice. Combinations of fruit and yoghurt (both fresh and frozen), ice cream, ice cubes, juice and milk can be used.

before using your Kenwood appliance

Read these instructions carefully and retain for future reference.
- Remove all packaging and any labels.
- Wash the parts: see 'carc & cleaning'.

safety

Switch off and unplug: before fitting and removing parts after use
- Never lot: the power unit, cord or plug get wet.
- Never use a damaged machine. Get it checked or repaired: see 'service'.
- Never use an unauthorised attachment.
- Never leave the appliance on unattended.
- Always wait until the blades have completely stopped before removing the mud from the power unit.
The unit may also be used for making soups but only bend cold ingredients.
- Never blend hot ingredients or drink any hot liquids from the travel mug.

• When drinking through the lid, take care that the drink is smooth. Some experimentation may be necessary to achieve the desired result, particularly when processing firm or untopened foods as you may find that some ingredients remain unprocessed.
  Always take care when handling the blade assembly and avoid touching the cutting edges of the blades when cleaning.
  Only use the Smoothie Blendar with the blade assembly supplied.
  Always use the Smoothie Bonder on a account: dry level surface.
• Never place the appliance on or near a hot gas or electric burner or where it could come into contact with a healed appliance.
• Misuse of your Smoothie Blender can result in injury.
  This appliance is not intended for use by persons (including children) with reduced physical, sensory or mental capabilities, or lack of experience and knowledge, unless they have been given supervision or instruction concerning use of the appliance by a person responsible for their safety.
  Children should be supervised to ensure that they do not play with the appliance.
  Only use the appliance for its intended domestic use. Kamwood will not accept any liability if the appliance is subject to improper use, or failure to comply with these instructions.

before plugging In

Make sure your electricity supply is the same as the one shown on the underside of the appliance.
This appliance conforms to EC directive 2004/108/EC on Electromagnetic Compatibility and EC regulation no. 1935/2001 of 27/10/2004 on materials intended for contact with food.

key

①blade assembly
② dispensing lid x 2
③ travel mug x 2
④ power unit
⑤ speed control

to use your smoothie blender

1 Add ice or frozen ingredients to the mug ①.
- This includes frozen fruit, frozen yoghurt, ice cream or ice. These can be added up to the level marked 'max frozen ingredients'.
2 Add liquid ingredients to the mug.
- This includes fruit (not frozen), fresh yoghurt, milk and fruit juices. These can be placed into the mug to the level marked 'max capacity'.
3 Hold the underside of the blade unit and lower it onto the mug, blades down - turn clockwise to lock 1.
4 Shake to disperse the ingredients.
5 To fit the assembled mug to the power unit, turn the mug upside down and line up the tabs on the mug with the grooves in the power unit and then turn clockwise until a positive click is heard 2.
6 Select the required speed.
- When blending recipes that include frozen ingredients turn the speed control to 'low' for 5 seconds to start the mixing process, then turn the speed control to 'high'.
- Allow the ingredients to blend until smooth.
7 When the desired consistency is reached, turn the speed control to the 'off' position. Turn the mug anticlockwise to release it from the power unit.
8 Turn the mug the other way up and unscrew the blade assembly.
9 Fit and lock the lid by turning clockwise.
- When you want to drink the smoothie, simply flip open the lid cover and clip into position 3. The drink can be consumed straight from the mug.

Hints&tips

Note that when the mug is filled to max capacity (500ml), this is approximately two servings.
- If you don't intend to consume your smoothie drink immediately, keep it refrigerated.
- Ensure your smoothie drink is thin enough to be able to drink from the dispensing lid. To make a thinner smoothie drink add more liquid.
- Once your smoothie drink has reached the desired consistency, you can use the pulse 'P' to ensure all ingredients are thoroughly blended. Use the pulse 'P' to operate the power unit in a start stop action to control the texture of your drink.
- After blending, some drinks may not be completely smooth due to seeds or the fibrous nature of ingredients.
- Some drinks may separate on standing, therefore it's best to drink them straight away. Separated drinks should be stirred before drinking.
important
- Never blend dry ingredients (eg spices, nuts) or run the Smoothie Blender empty.
- Don't use the Smoothie Blender as a storage container whilst on the power unit.
- Some liquids increase in volume and froth during blending e.g milk, so do not overfill and ensure the blade assembly is correctly fitted.
To ensure long life of your Smoothie Blender, never run it continuously for longer than 30 seconds.
- Never blend food that has formed a solid mass during freezing, break it up before adding to the mug.
- Never blend more than the max capacities marked on the mug.
- When the dispensing lid is fitted always keep the travel mug upright.

care & cleaning

Always switch off, unplug and dismantle before cleaning.
- Never let the power unit, cord or plug get wet.
Always wash immediately after use. Don't let food dry onto the mug assembly as this will make cleaning difficult.
- Don't wash any part in the dishwasher.

powerunit

• Wipe with a damp cloth, then dry.

bladeunit

1 Don't touch the sharp blades - brush them clean using hot soapy water, then rinse thoroughly under the tap. Don't immerse the blade assembly in water.
2 Leave to dry upside down away from children.

muganddispensinglid

Wash by hand, rinse with clean water then dry.

service and customer care

• If the cord is damaged it must, for safety reasons, be replaced by KENWOOD or an authorised KENWOOD repairer.
  If you need help with:
• using your appliance or
  servicing or repairs
• Contact the shop where you bought your appliance.
• Designed and engineered by Kenwood in the UK.
  Made in China.

IMPORTANT INFORMATION FOR CORRECT DISPOSAL OF THE PRODUCT IN ACCORDANCE WITH EC DIRECTIVE 2002/96/EC.

At the end of its working life, the product must not be disposed of as urban waste.

It must be taken to a special local authority differentiated waste collection

centre or to a dealer providing this service.

Disposing of a household appliance separately avoids possible negative consequences for the environment and

health deriving from inappropriate disposal and enables the constituent materials to be recovered to obtain significant savings in energy and

resources. As a reminder of the need to dispose of household appliances separately, the product is marked with a crossed-out wheeled dustbin.

recipes

Breakfast Smoothies

breakfast 2GO

1 serving (300ml)

2 ice cubes

60ml skimmed milk

50g low fat yoghurt

50g banana cut into 2cm slices

75g apple, chopped into 2cm chunks

5ml wheatgerm

5ml runny clear honey

1 Place the ice cubes, milk and yoghurt in the mug. Then add the banana, apple and wheat germ. Shake well before blending.
2 Switch to 'low' for 5 seconds, then 'high' for 20 seconds. Check the sweetness and add the Honey if required.

ruby grapefruit oatie

1 serving (250ml)

150ml ruby grapefruit juice

50ml natural wholemilk yoghurt

50g banana cut into 2cm slices

1tbsp porridge oats

1tbsp clear runny honey

1 Add the grapefruit juice and yoghurt to the mug. Then add the banana and porridge. Shake well before blending.
2 Switch to 'high' for 15 seconds. Check the sweetness and add the Honey if required.

nutty banana boost

1 serving (250ml)

75ml semi-skimmed milk

115g low fat hazelnut yoghurt

50g banana cut into 2cm slices

3 ready to eat dried apricot, chopped into 1cm pieces

1 Add the milk and yoghurt to the mug. Then add the banana and apricot. Shake well before blending.
2 Switch to 'low' for 5 seconds, then 'high' for 25 seconds.

Fruity Smoothies

iced strawberry sensation

1 serving (250ml)

2 Ice cubes
70ml apple juice
60g strawberries, hulled and halved
80g cantaloupe melon, seeded and cut into 2cm chunks
5ml runny clear honey

1 Add the ice cubes and apple juice to the mug. Then add the strawberries and melon.
2 Switch to 'low' for 5 seconds, then 'high' for 20 seconds. Check the sweetness and add the Honey if required.

mango, pineapple, passion fruit juice smoothie

1 serving (300ml)

150ml freshly squeezed orange juice
85g ripe mango cut into 2cm chunks
65g pineapple chopped into 2cm chunks
½ passion fruit

1 Add the orange juice to the mug.
Then add the mango, pineapple and passion fruit.
2 Switch to 'high' for 20 seconds.

papaya & peach nectar

1 serving (250ml)

100ml grapefruit juice
100g canned peach slices in fruit juice/drained
70g papaya, seeded and cut into 2cm chunks

1 Add the grapefruit juice, peach and papaya to the mug.
2 Switch to 'high' for 15 seconds.

berry smoothie

1 serving (250ml)

100ml cranberry juice

25ml apple juice

75g raspberries

40g blackberries

1 Add the cranberry and apple juice to the mug. Then add the berries.
2 Switch to 'high' for 20 seconds.

ice cool fruity

1 serving (300ml)

2 ice cubes

100ml orange Juice

50g kiwi fruit cut into 2cm pieces

75g strawberries, hulled and halved

1 Add the ice cubes and orange juice to the mug. Then add the kiwi fruit and strawberries.
2 Switch to 'low' for 5 seconds, then 'high' for 20 seconds.

summer fruit smoothie

1 serving (250ml)

50g frozen summer fruit mix

200ml semi-skimmed milk

1 Add the fruit and milk to the mug.
2 Switch to 'low' for 5 seconds, then 'high' for 25 seconds.

Vegetable Smoothies

minted lassi cooler

1 Serving (250ml)

2 ice cubes

150ml natural wholemilk yoghurt
90g 1/4cucumber peeled, deseeded and chopped into 2cm slices
4 mint leaves

1 Place the ice cubes, yoghurt,
cucumber and mint into the mug.
2 Switch to 'low' for 5 seconds, then 'high' for 25 seconds.

avocado smoothie

1 serving (300ml)

200ml white grape juice

10ml lemon juice

50g 1/2 small avocado, stoned,

peeled and chopped into 6 pieces.

60g 1/2 ripe pear, peeled, cored &

chopped into 2cm chunks.

few drops of Tabasco, optional

1 Place the grape and lemon juice, avocado and pear into the mug
2 Switch to 'high' for 20 seconds.

beetroot buzz

1 serving (250ml)

50ml freshly squeezed orange juice
100ml apple juice
15g carrot, grated.
5g fresh root ginger, peeled &
grated.
50g cooked fresh baby beetroot, cut into 2cm chunks.

1 Add the orange and apple juice to the mug. Then add the carrot, ginger and beetroot.
2 Switch to 'low' for 5 seconds, then 'high' for 25 seconds.

Nederlandss

50ml sodmaelksyoghurt natural

50g banan, skåret i stykker på 2cm

1spsk havregryn

1 spsk flydende honning

iced strawberry sensation

1 kişilik (250ml)

2 buz kupu

70ml elma suyu

Py6nHObI rpeINΦpyT C OBCaHKOJ

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OpexObo-6aHaHOBa Cmecb

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2 BkIIOUHTe 'low' («Hn3Kyo») CKOpocTb Ha 5 cekyHd, 3aTeM 'high' («BbICOKyO») Ha 25 cekyHd.

ФpyКTOBbie KOKTeJIN Kny6Huka co Jbdom ceHcaIGNa

1 npu (250 m) 2 ky6nka nbda 70 mI y6noHoro coka 60 r Kny6nKn, OunueHHo n pa3pe3aHHoN nonolam 80 r MyCKyCHO dBiHn, OunueHHoN OT cemH n Hape3aHHoN 2- CAHTIMETPOBbIMn DOJbKaMn 5 MJI YNCTOTO XINKOTo MeDa

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2 BkIIOUHTe 'low' («Hn3Kyo») ckOpocTb Ha 5 cekyHd, 3aTeM 'high' («BbICOKyO») Ha 25 cekyHd. IpoBepbTe, nolyuHnacb JIn Cmecb DoCTaTOUHO cnaIkoN, n npn Heo6xOIMOCtN do6abbTe Mei

Cmecb n3 MaHro, aHaHaca, MapaKuNn pkykTOBOrO coka

1 npu (300 m)

150MnCBExeBbIXaTOro anelbcNHOBOrO coka
85 r cneIoro MaHro, Hape3aHHoro 2-caHTmEtpoBbIMn DoJIbKaMn
65raHaHaHaca,Hapy6neHHoro 2-CAHTUMeTpOBbIMNJOMTKaM11/2 mapaKyu
1 HaneIe B KpyKky anelbcnHObbl cok. 3aTeM do6abTe MaHro, aHaHac N MapaKyuN.
2 BkIIOUHTe 'high' («ВьICOKyH») ckopoCTb Ha 20 cekyHd.

Паай-персNKOBьн HeKтap

1 npua (250 mn)
100 mI rpeu nppyTOBOrO coka
100 r KOHceBnpoBaHHbIX dOJIeK nepcNka BO ppyKTOBOM COKe/6e3 coka
70 r nana, ouHcHHOIOTcMHNape3aHHo2-caHTmETpOBbIMNJOMTKaMI
1 HanonHnTe KpyKky rpeindppyTObIM cOKOM, nepcNKamn nnanae.
2 BkIIOUHTe 'high' («ВьICOKyH») ckopoCTb Ha 15 cekyHd.

Яюньй кokтейь

1 npua (250 mn)

100 Mn KJIIOKBeHHoro coka
25 mIЯ6noHoro coka
75 mʌnHbɪ
40 rekeBukn

1 Haene Te B Kpykky KIOKBeHHbI n 6NoHbI COK. 3aTeM Do6aBbTe rObl.
2 BknIOuHTe 'high' («ВьICOKyI») ckopoCTb Ha 20 cekyHd.

OxnaKdEHHbI ΦpyKTOBbI KOKTeJb

1 npu (300 m)

2kybkaIbda

100Mn aneIbcHOBOrO coka
50 r (1/2) плда КИВи,
Hape3aHHoro 2-caHTIMeTpObBIMN
KycOчКamN
75 r Kny6HnK, OuHneHHo n pa3pe3aHHo nnonam

1 Tomecnte B Kpykky Kybkn Nbda HaneIte anelbcnHObbl cok. 3aTe mdoabBe Te KNBn n Kny6Hnky.
2 BkHouHTe 'low' («Hn3kyH») CKOpocTb Ha 5 cekyHd, 3aTeM 'high' («BbICOKyH») CKOpocTb Ha 20 cekyHd.

JIeTHNΦpyKTOBbIKoKTeiIb

1 nopua (250 m)

50 r mopoxeHoi cmei neTHnx fpykTOB
200 MЛ HeKnupHoro MONoka

1 3aONHnTe KpyKky ppyKTamN mOJOKOM.
2 BkIIOUHTe 'low' («Hn3Kyo») CKOpocTb Ha 5 cekyHd, 3aTeM 'high' («BbICOKyo») Ha 25 cekyHd.

OboHbIe Kokmeu

MЯTHbI npOxJaInteJIbHbI

1 npu (250 m)

2kybkaIbda
150 MIn NOrypTa n3 HAtypaBHorO UeJIbHOrO MoJOKa
90 r ann 1/4 ouuueHHoro ot Koxypbl n cemn orypua, Hap6neHHoro 2-caHTmEtpoBb DOJIbKaMn
4 NICTUKA MRTbI

1 IomecTHe B KpyKky Ky6nKn Ibda, Norypt, orypuIM MAty.
2 BkIIOUHTe 'low' («Hn3Kyo») CKOpocTb Ha 5 cekyHd, 3aTeM 'high' («BbICOKyo») Ha 25 cekyHd.

KokTeiNb n3 aBOKaDo

1 npu (300 m)

200 mI 6enoro BnHorpaHoro coka

10 MЛ JIMMOHHORO COKA

50r(1/2)MeNKoro,ouHHeHHoroOT KocToueKIOKxypblnOda aBOKaDo,pa3py6IeHHoroHa6 qacte.

60r(1/2) ouHHeHHoT KOxypbl, cpeNoI rpyuIN C BByuHHeHHoC cepdueBHHoH, HApybIeHHoN 2- CaHTIMETPOBbIMN DOJIbKaMn. HeckoJbKO kaneJIb o6bUHoro coyc «Tabacko»

1 Tomecntte B kpykky BnHOrpaHbI IN JIMOHbI COKN, a TaKKe abOKaDo n rpyu.
2BknHnTe 'high'（《BbICOKyIO》）ckopocTb Ha 20 cekyHd.

60 ml aTROBOUTupwEvo yala

50 yp. yiaoupti με xαμnλa λπapá

50 yp. pTavava kouevn 2K

$$ \therefore \angle 5 = \angle 6 $$

$$ \begin{array}{l} \because \cos \dot {=} 1 5 ^ {\circ} = 1 5 ^ {\circ} \ \ddagger \ddagger \ \lambda = \frac {1}{2} \pi^ {2} \int_ {0} ^ {\infty} \frac {1}{r ^ {2}} \int_ {0} ^ {\infty} 4 6 1 H \ 1 5 ^ {\circ} \vert 1 5 ^ {\circ} = (1 k ^ {\circ} - 2) ^ {\circ} \ 1, 5, 7, 8, 9, 1 0, 1 1, 1 2, 1 3, 1 4, 1 5, 1 6 \ \therefore \sqrt {3} r = m \ \therefore 3 \pi \pi - 2 \pi \sqrt {1 5} \pi \pi \pi \pi \pi \pi \pi \pi \ \dots 3 \div 2 0 \dots 1 0 \dots 3 0 ^ {5} \dots 1 0 1 5) 5 ^ {1 0} \ \dots \mathrm {o p e r a t o r} ^ {\prime} \ S _ {\Delta} P M = \frac {1}{2} O A O P \ \therefore \because \square \sim \square \sim \square \sim \square \sim 2 \ \end{array} $$

$$ \begin{array}{l} 0. 2 7 \dot {3} \ (1) \dots 2) \text {r o r} 0. 5 1, 7 1, 1 8 9 2, 4 6 1 H \ \lambda \leqslant 1 0 ^ {2} \quad 1 5 \leqslant 1 0 ^ {3} \quad 1 5 \leqslant 1 0 ^ {4} \quad M O 7 \quad (1 5 ^ {\circ} - C) \ \sigma_ {1} \vdots \vdots \vdots \ (1) \because \mathrm {c o n v e c t i o n} \quad 5 ^ {\prime} = 1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 \ \therefore \left| \sum_ {i = 1} ^ {n} \frac {1}{i} \right| = \sum_ {i = 1} ^ {n} \frac {1}{i} \ \downarrow \ 0. 3 \div \dots 9. 2 0 p ^ {5} \frac {1}{2} 0. 2 7 1 r ^ {5} \frac {1}{2} 0. 2 7 1 \ 0 3 \div 1 6 = \dots 9 7 \dots 2 0 0 \dots 8 0 0 \dots 1 0 8 \ 0. 3 \div c = \frac {1}{2} \ \dots \text {o f o v e r} 2 \ \therefore o p \text {o p} \text {o p} \text {o p} \text {o p} \text {o p} \text {o p} \text {o p} \text {o p} \text {o p} \text {o p} \text {o p} \ S _ {\Delta} = \frac {1}{2} \cdot \frac {1}{2} \cdot \frac {1}{2} \cdot \frac {1}{2} \cdot \frac {1}{2} \cdot \frac {1}{2} \ \end{array} $$

$$ \therefore \cos \frac {1}{2} = \frac {1}{2} $$

$$ \widehat {T} $$

$$ \begin{array}{l} \therefore \frac {1}{2} \times 1 0 ^ {3} \times 1 0 ^ {3} = 1 0 0 \ \sqrt {1 5} \times 1 0 ^ {3} (1 k ^ {\prime}) \ 1 1 \frac {1}{2} \frac {1}{\pi} \frac {1}{\pi} \frac {1}{\pi} \frac {1}{\pi} \frac {1}{\pi} \frac {1}{\pi} \frac {1}{\pi} \frac {1}{\pi} \frac {1}{\pi} \frac {1}{\pi} \ \therefore \overrightarrow {a} = \frac {1}{2} (\overrightarrow {a} + \overrightarrow {b}) \ 1 1 \mathrm {i} ^ {\prime} \mathrm {e} ^ {\prime} \mathrm {c} ^ {\prime} \mathrm {c} ^ {\prime} \mathrm {c} ^ {\prime} \mathrm {c} ^ {\prime} \mathrm {c} ^ {\prime} \mathrm {c} ^ {\prime} \mathrm {c} ^ {\prime} \mathrm {c} ^ {\prime} \mathrm {c} ^ {\prime} \mathrm {c} ^ {\prime} \mathrm {c} ^ {\prime} \mathrm {c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c c} \ \therefore 2 ^ {2} (\cos \theta - \sin \theta) = \cos \theta \ 1 5. 6 5 \times 2 0 = 2 8 0 8 9 \approx 1 5. 6 5 \ \therefore 0? \text {c o n v e r} \quad \text {c o n v e r} \quad \text {c o n v e r} \quad \text {c o n v e r} \quad \text {c o n v e r} \quad \text {c o n v e r} \ \therefore \mathrm {o p e r i o d} \ \dots a o f \mathrm {o n} \mathrm {o r} \mathrm {i n} \ \end{array} $$

$$ 2 0 \div 1 0 = \dots 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 $$

$$ \therefore \angle 2 = \angle 6 $$

$$ \frac {1}{2} \times 1 0 ^ {6} > 1 0 ^ {6} $$

$$ \begin{array}{l} 0. 2 7 \dot {3} \ \left| \Gamma_ {1} \right| = \left| \Gamma_ {2} \right| = 0. 5 1 7 5 ^ {\circ} \left| \Gamma_ {3} \right| = 4 8 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 1 \ \lambda = \frac {1}{2} \pi^ {2} (1 5 - \theta) ^ {2} + \frac {1}{2} \pi^ {2} M O T (1 5 m o l \ \sin \pi 3 \sqrt {1} \pi 1 5 ^ {\prime} \pi (1) ^ {2} = \ 1 1 5 \div \frac {1}{2} = 5 \dots 3 \ 3 \text {或} 2 \dots 2 0 7 3 \ \cos \alpha = 1 5 ^ {\circ} - 1 5 ^ {\circ} - \alpha + \lambda \ \therefore b 3 (r \sqrt {2} r o r s e n r) o r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r \ 0. 1 \text {或} \div 7 5 ^ {3} \times 1 0 ^ {- 2} 5 7 0 1 1 \ 0 2 0 7: y ^ {2} \ S _ {\Delta} = \frac {1}{2} \cdot \cos \theta - \frac {1}{2} \cdot \sin \theta \ \end{array} $$

$$ \begin{array}{l} | \sqrt [ n ]{\cdots} | \ \therefore \cos \angle 1 = \frac {1}{2} \sin \angle 7 = \frac {1}{2} \ 1 1 0 0 - 6 \div x = 3 6 0 \ \therefore \sin \alpha = 1 1 0 0 ^ {\circ} - 1 6 1 0 \ \end{array} $$

$$ \begin{array}{r l} & {\quad \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} \dots} \ & {\quad \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}{\mathrm {的}} 4 0 H ^ {\prime}} \ & {\quad \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 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 3}} \ & {\quad \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 {3}{4}} \ & {\quad \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 {3}{4}} \ & {\quad \cdot o p s i g m a _ {\mathrm {i n t e r}} ^ {\prime} (i) ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, } \ & {\quad \cdot o p s i g m a _ {\mathrm {i n t e r}} ^ {\prime} (i) ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, } \ & {\quad \cdot o p s i g m a _ {\mathrm {i n t e r}} ^ {\prime} (i), i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, i ^ {\prime}, } \ & {\quad S O _ {i j k l} = S O _ {i j k l}. (i, j, k) .} \end{array} $$

$$ \begin{array}{r l} & \mathrm {o n t h e r s o u r c e 1 1 5 \mathrm {c m p a r t}} \ & \quad \mathrm {o n t h e r s o u r c e 1 1 5 \mathrm {c m p a r t}} \ & {\quad \mathrm {o n t h e r s o u r c e 1 1 5 \mathrm {c m p a r t}} \ & {\quad \mathrm {o n t h e r s o u r c e 1 1 5 \mathrm {c m p a r t}}} \ & {\quad \mathrm {o n t h e r s o u r c e 1 1 5 \mathrm {c m p a r t}}} \ & {\quad \mathrm {o n t h e r s o u r c e 1 1 5 \mathrm {c m p a r t}}} \ & {\quad \mathrm {o n t h e r s o u r c e 1 1 5 \mathrm {c} m p a r t}} \ & {\quad \mathrm {o n t h e r s o u r c e 1 1 5 \mathrm {c m p a r t}}} \ & {\quad \mathrm {o n t h e r s o u r c e 1 1 5 \mathrm {c m p a r t}}} \ & {\quad \mathrm {o n t h e r s o u r c e 1 1 . 5 \mathrm {c m p a r t}}} \ & {\quad \mathrm {o n t h e r s o u r c e 1 1 . 5 \mathrm {c m p a r t}}} \ & {\quad \mathrm {o n t h e r s o u r c e 1 . 5 \mathrm {c m p a r t}}} \ & {\quad \mathrm {o n t h e r s o u r c e 1 . 5 \mathrm {c m p a r t}}} \ & {\quad \mathrm {o n t h e r s o u r c e 1 . 5 \mathrm {c m p a r t}}} \ & {\quad \mathrm {o n t h e r s o u R C}} \ & {\quad \mathrm {o n t h e r s o u R C}} \ & {\quad \mathrm {o n t h e r s o u R C}} \ & {\quad \mathrm {o n t h e r s o u R C}} \ & {\quad \mathrm {o n t h e r s o u R C}} \ & {\quad \mathrm {o n t h e r s o u R C}} \ & {\quad} \ & {\quad \mathrm {o n t h e r s o u R C}} \ & {\quad \mathrm {o n t h e r s o u R C}} \ & {\quad \mathrm {o n t h e r s o u R C}} \ & {\quad \mathrm {o n t h e r s o u R C}} \ & {\quad \mathrm {o n t h e r s o u R C}} \ & {\quad}} \ & {\quad \mathrm {o n t h e r s o u R C}} \ & {\quad \mathrm {o n t h e r s o u R C}} \ & {\quad \mathrm {o n t h e r s o u R C}} \ & {\quad \mathrm {o n t h e r s o u R C}} \ & {\quad \mathrm {o n t h e r s o u R C}} \ & {\left. \right|} \ & {\quad} \ & {\quad \mathrm {i f} (\text {a l p h a})} \ & {\quad \mathrm {i f} (\text {a l p h a})} \ & {\quad \mathrm {i f} (\text {a l p h a})} \ & {\quad \mathrm {i f} (\text {a l p h a})} \ & {\quad \mathrm {i f} (\text {a l p h a})} \ & {\quad \mathrm {i f} (\text {a l p h a}).} \end{array} $$

$$ \begin{array}{r l} & {\mathrm {g a m m a}} \ & {\mathrm {A l l o w e d i s t r i b u t i o n s :}} \ & {\mathrm {1 1 0 0 H r e s h e d i s t r i b u t i o n s :}} \ & {\mathrm {1 1 0 0 H r e s h e d i s t r i b u t i o n s :}} \ & {\mathrm {1 1 0 0 H r e s h e d i s t r i b u t i o n s :}} \ & {\mathrm {1 1 0 0 H r e s h i n g t h e r e f o r e s t r i b u t i o n s :}} \ & {\mathrm {1 1 0 0 H r e s h i n g t h e r e f o r e s t r i b u t i o n s :}} \ & {\mathrm {1 1 0 0 H r e s h i n g t h e r e f o r e s t r i b u t i o n s :}} \ & {o v e r 2 \mathrm {g a m m a} \mathrm {i n t e r n a l .}} \ & {o v e r 3 \mathrm {g a m m a} \mathrm {i n t e r n a l .}} \ & {o v e r 4 \mathrm {g a m m a} \mathrm {i n t e r n a l .}} \ & {o v e r 5 \mathrm {g a m m a} \mathrm {i n t e r n a l .}} \ & {o v e r 6 \mathrm {g a m m a} \mathrm {i n t e r n a l .}} \ & {\mathrm {s o l v e d i s t r i b u t i o n s :}} \ & {\mathrm {1 1 0 0 H r e s h i n g t h e r e f o r e s t r i b u t i o n s :}} \ & {\mathrm {1 1 0 0 H r e s h i n g t h e r e f o r e s t r i b u t i o n s :}} \ & {\mathrm {1 1 0 0 H r e s h i n g t h e r e f o r e s t r i b u t i o n s :}} \ & {\mathrm {1 1 0 0 H r e s h i n g t h e r e f o r e s t r i b u t i o n s :}} \ & {\mathrm {1 1 0 0 H r e S h i n g t h e r e f o r e s t r i b u t i o n s :}} \ & {\mathrm {1 1 0 0 H r e S h i n g t h e r e f o r e s t r i b u t i o n s :}} \ & {\mathrm {1 1 0 0 H r e S h i n g t h e r e f o r e s t R I T E R .}} \end{array} $$

$$ \begin{array}{r l} & {\dot {r} \dot {r} \dot {r} \dot {r}} \ & {\dot {r} \dot {r} \dot {r} \dot {r} \dot {r} \dot {r} \dot {r} \dot {r} \dot {r} \dot {r} \dot {r} \dot {r} \dot {r} \dot {r} \dot {r} \dot {r} \dot {r} \dot {r} \dot {r} \dot {r} \dot {r} r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r r} \ & {\quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad 1 5 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 7 8} \ & {\qquad \qquad \qquad \qquad \qquad \qquad \qquad \qquad \qquad \qquad \qquad \qquad \qquad \qquad \qquad \qquad \qquad \qquad \qquad \qquad \qquad \qquad \qquad \qquad \qquad \qquad \qquad \qquad \qquad \qquad \qquad \qquad \qquad \qquad \cdot a ^ {\prime} = a ^ {\prime} + a ^ {\prime} + a ^ {\prime} + a ^ {\prime} + a ^ {\prime} + a ^ {\prime} + a ^ {\prime} + a ^ {\prime} + a ^ {\prime} + a ^ {\prime} + a ^ {\prime} + a ^ {\prime} + a ^ {\prime} + a ^ {\prime} + a ^ {\prime} + a ^ {\prime} + a ^ {\prime} + a ^ {\alpha}} \ & {\qquad (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)} \ & {\qquad (2) = (2) + (2) - (2) + (2) - (2) + (2) - (2) + (2) - (2) + (2) - (2) + (2) - (2)} \ & {\qquad (3) = (3) + (3) - (3) + (3) - (3) + (3) - (3) + (3) - (3)} \ & {\qquad (4) = (4) + (4) - (4) + (4) - (4) + (4) - (4)} \ & {\qquad (5) = (5) + (5) - (5) + (5) - (5) + (5) - (5)} \ & {\qquad (6) = (6) + (6) - (6) + (6) - (6)} \ & {\qquad (7) = (7) + (7) - (7) + (7) - (7)} \ & {\qquad (8) = (8) + (8) - (8) + (8) - (8)} \ & {\qquad (9) = (9) + (9) - (9) + (9) - (9)} \ & {\qquad (1 0) = (\mathrm {的}) + (\mathrm {的}) - (\mathrm {的}) + (\mathrm {的}) - (\mathrm {的}) + (\mathrm {的}) - (\mathrm {的}) + (\mathrm {的}) - (\mathrm {的}) + (\mathrm {的}) - (\mathrm {的}) + (\mathrm {的}) - (\mathrm {的}) + (\mathrm {的}) - (\mathrm {的}) + (\mathrm {的}) - (\mathrm {的}) + (\mathrm {的}) - (\mathrm {这}) + (\mathrm {的}) - (\mathrm {这}) + (\mathrm {的}) - (\mathrm {这}) + (\mathrm {的}) - (\mathrm {这}) + (\mathrm {的}) - (\mathrm {这}) + (\mathrm {的}) - (\mathrm {这}) + (\mathrm {的}) - (\mathrm {这}) + (\mathrm {的}) - (\mathrm {这}) + (\mathrm {的}) - (\mathrm {这}) + (\hat {})} \ & {\qquad (\hat {} = | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | |} \ & {\qquad (\hat {} = | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | | |} \ & {\qquad (\hat {} = i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}} \ & {\qquad (\hat {} = i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i_ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i_ {-}, i _ {-}, i _ {-}} \ & {\qquad (\hat {} = i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}, i _ {-}} \ & {\qquad (\hat {} = i _ {-}, i _ {-}, i _ {\cdot}), (\hat {} = j, j), (\hat {} = k, k), (\hat {} = l, l), (\hat {} = m, m), (\hat {} = n, n), (\hat {} = o, o), (\hat {} = p, p), (\hat {} = q, q), (\hat {} = s, s), (\hat {} = t, t), (\hat {} = u, u), (\hat {} = v, v), (\hat {} = w, w), (\hat {} = x, x), (\hat {} = y, y), (\hat {} = z, z).} \ & {\qquad (\hat {} = o, o), (\hat {} = p, p), (\hat {} = q, q), (\hat {} = s, s), (\hat {} = t, t), (\hat {} = w, w), (\hat {} = x, x), (\hat {} = y, y), (\hat {} = z, z).} \ & {\qquad (\hat {} = o, o), (\hat {} = p, p), (\hat {} = q, q), (\hat {} = s, s), (\hat {} = t, t), (\hat {} = w, w), (\hat {} = z, z).} \ & {\qquad (\hat {} = o, o), (\hat {} = p, p), (\hat {} = q, q), (\hat {} = s, s), (\hat {} = t, t), (\hat {} = w, w), (\hat {} = z, z).} \ & {\qquad (\hat {} = o, o), (\hat {} = p, p), (\hat {} = q, Q), (\hat {} = s, s), (\hat {} = t, t), (\hat {} = w, w), (\hat {} = z, z).} \ & {\qquad (\hat {} = o, o), (\hat {} = p, p), (\hat {} = q, q), (\hat {} = s, s), (\hat {} = t, t), (\hat {} = w, w), (\hat {} = z, z).} \ & {\dot {\bar {r}}.} \ & {\dot {\bar {s}}.} \ & {\dot {\bar {t}}.} \ & {\dot {\bar {u}}.} \ & {\dot {\bar {v}}.} \ & {\dot {\bar {w}}.} \ & {\dot {\bar {x}}.} \ & {\dot {\bar {y}}.} \ & {\dot {\bar {z}}.} \ & {\dot {\bar {u}}.} \ & {\dot {\bar {v}}.} \ & {\dot {\bar {w}}.} \ & {\dot {\bar {x}}.} \ & {\dot {\bar {y}}.} \ & {\dot {\bar {z}}.} \ & {\dot {\bar {u}}.} \ & {\dot {\bar {v}}.} \ & {\dot {\bar {w}},} \ & {\dot {\bar {x}},} \ & {\dot {\bar {y}},} \ & {\dot {\bar {z}},} \ & {\dot {\bar {u}},} \ & {\dot {\bar {v}},} \ & {\dot {\bar {w}},} \ & {\dot {\bar {x}},} \ & {\dot {\bar {y}},} \ & {\dot {\bar {z}},} \ & {\dot {\bar {u}},} \ & {\dot {\bar {v}},} \ & {\dot {\bar {w}},} \ & {\dot {\bar {x}},} \ & {\dot {\bar {y}},} \ & {\dot {\bar {z}}.} \ & {\dot {\bar {u}},} \ & {\dot {\bar {v}},} \ & {\dot {\bar {w}},} \ & {\dot {\bar {x}},} \ & {\dot {\bar {y}},} \ & {\dot {\bar {z}},} \ & {\dot {\bar {u}},} \ & {\dot {\bar {v}},} \ & {\dot {\bar {w}},} \ & {\dot {\bar {x}}.} \ & {\dot {\bar {y}},} \ & {\dot {\bar {z}},} \ & {\dot {\bar {u}},} \ & {\dot {\bar {v}},} \ & {\dot {\bar {w}},} \ & {\dot {\bar {x}},} \ & {\dot {\bar {y}},} \ & {\dot {\bar {z}},} \ & {\dot {\bar {u}},} \ & {\dot {\bar {v}}.} \ & {\dot {\bar {w}},} \ & {\dot {\bar {x}},} \ & {\dot {\bar {y}},} \ & {\dot {\bar {z}},} \ & {\dot {\bar {u}},} \ & {\dot {\bar {v}},} \ & {\dot {\bar {w}},} \ & {\dot {\bar {x}},} \ & {\dot {\bar {v}},} \ & {\dot {\bar {w}},} \ & {\dot {\bar {x}},} \ & {\dot {\bar {y}},} \ & {\dot {\bar {z}},} \ & {\dot {\bar {u}},} \ & {\dot {\bar {v}},} \ & {\dot {\bar {w}},} \ & {\dot {\bar {x}},} \ & {\dot {\bar {v}},} \ & {\dot {\bar {w}}.} \ & {{\ddot {[}}; [ ]}. $$

$$ \begin{array}{r l} & {\lambda \stackrel {c r o s s} {=} | \Gamma^ {c r o s s} \cap \Gamma^ {c r o s s} | ^ {2} M O 7 (| \Gamma^ {c r o s s} | ^ {2}} \ & {\qquad (| \Gamma^ {c r o s s} | ^ {2}) \cdot} \ & {\qquad | \Gamma^ {c r o s s} (| \Gamma^ {c r o s s} |) \cdot \stackrel {d e f} {|} | \Gamma^ {c r o s s} | ^ {2} | | \Gamma^ {c r o s s} | ^ {2} | | \Gamma^ {c r o s s} | ^ {2}} \end{array} $$

$$ \begin{array}{r l} & \text {1 5} \frac {\pi}{2} \frac {\pi}{3} \frac {\pi}{4} \frac {\pi}{5} \frac {\pi}{6} \frac {\pi}{7} \frac {\pi}{8} \frac {\pi}{9} \frac {\pi}{1 0} \frac {\pi}{1 1} \frac {\pi}{1 2} \frac {\pi}{1 3} \frac {\pi}{1 4} \frac {\pi}{1 5} \frac {\pi}{1 6} \frac {\pi}{1 7} \frac {\pi}{1 8} \frac {\pi}{1 9} \frac {\pi}{2 0} \frac {\pi}{2 1} \frac {\pi}{2 2} \frac {\pi}{2 3} \frac {\pi}{2 4} \frac {\pi}{2 5} \frac {\pi}{2 6} \frac {\pi}{2 7} \frac {\pi}{2 8} \frac {\pi}{2 9} \frac {\pi}{3 0} \frac {\pi}{3 1} \frac {\pi}{3 2} \frac {\pi}{3 3} \frac {\pi}{3 4} \frac {\pi}{3 5} \frac {\pi}{3 6} \frac {\pi}{3 7} \frac {\pi}{3 8} \frac {\pi}{3 9} \frac {\pi}{4 0} \frac {\pi}{4 1} \frac {\pi}{4 2} \frac {\pi}{4 3} \frac {\pi}{4 4} \frac {\pi}{4 5} \frac {\pi}{4 6} \frac {\pi}{4 7} \frac {\pi}{4 8} \frac {\pi}{4 9} \frac {\pi}{5 0} \frac {\pi}{5 1} \frac {\pi}{5 2} \frac {\pi}{5 3} \frac {\pi}{5 4} \frac {\pi}{5 5} \frac {\pi}{5 6} \frac {\pi}{5 7} \frac {\pi}{5 8} \frac {\pi}{5 9} \frac {\pi}{6 0} \frac {\pi}{6 1} \frac {\pi}{6 2} \frac {\pi}{6 3} \frac {\pi}{6 4} \frac {\pi}{6 5} \frac {\pi}{6 6} \frac {\pi}{6 7} \frac {\pi}{6 8} \frac {\pi}{6 9} \frac {\pi}{7 0} \frac {\pi}{7 1} \frac {\pi}{7 2} \frac {\pi}{7 3} \frac {\pi}{7 4} \frac {\pi}{7 5} \frac {\pi}{7 6} \frac {\pi}{7 7} \frac {\pi}{7 8} \frac {\pi}{7 9} \frac {\pi}{8 0} \frac {\pi}{8 1} \frac {\pi}{8 2} \frac {\pi}{8 3} \frac {\pi}{8 4} \frac {\pi}{8 5} \frac {\pi}{8 6} \frac {\pi}{8 7} \frac {\pi}{8 8} \frac {\pi}{8 9} \frac {\pi}{9 0} \frac {\pi}{9 1} \frac {\pi}{9 2} \frac {\pi}{9 3} \frac {\pi}{9 4} \frac {\pi}{9 5} \frac {\pi}{9 6} \frac {\pi}{9 7} \frac {\pi}{9 8} \frac {\pi}{9 9} $$

$$ \cdot \sqrt {3} = \frac {1}{2} \cdot 7 0 ^ {2} (5 7 1 9 ^ {4} - 1) \approx 1 1. 1 2 5 \times 1 0 ^ {- 6} $$

$$ \therefore 3 8 1 6 7 2 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 $$

$$ \therefore \mathrm {o r} \mathrm {s o n e r} 2 $$

$$ 0. 2 \dot {1} \dot {7}: \dot {5} ^ {2} $$

$$ \cos \alpha = \frac {1}{2} \cos \alpha - 1 $$

$$ \therefore \frac {1}{2} \times 1 0 ^ {3} \times 1 0 ^ {3} \times 1 0 ^ {3} $$

$$ \begin{array}{l} \therefore r = 6 \ \therefore \mathrm {o n} 6 \mathrm {日} 0 6 1 5 p o w e r s i n p \end{array} $$

$$ \begin{array}{l} \text {o a} \frac {\pi}{2} \frac {\pi}{2} \ \text {i r} \frac {\pi}{2} \frac {\pi}{2} \text {o t h e r w i s e} \frac {\pi}{2} \frac {\pi}{2} \text {i r} \frac {\pi}{2} \frac {\pi}{2} \text {u b i l a r} \text {H} \text {o t h e r w i s e} \ \text {a} \frac {\pi}{2} \frac {\pi}{2} \text {i r} \frac {\pi}{2} \text {o t h e r w i s e} \frac {\pi}{2} \text {M O T} (\frac {\pi}{2}) \ \text {i r} \frac {\pi}{2} \frac {\pi}{2} \text {i n t h e r m o n e r m a l p r o x i s t e d} \ \text {(i r)} \frac {\pi}{2} \frac {\pi}{2} \text {o t h e r w i s e} \frac {\pi}{2} \frac {\pi}{2} \text {i r} \frac {\pi}{2} \frac {\pi}{2} \text {u b i l a r} \text {M O T} (\frac {\pi}{2}) \ \text {i r} \frac {\pi}{2} \frac {\pi}{2} \text {i n t h e r m o n e r m a l p r o x i s t e d} \ \text {(i r)} \frac {\pi}{2} \frac {\pi}{2} \text {o t h e r w i s e} \frac {1 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 1 5 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0} \ \text {i r} \frac {\pi}{2} \frac {\pi}{2} \text {i n t h e r m o n e r m a l p r o x i s t e d} \ \text {a} \frac {\pi}{2} \frac {\pi}{2} \text {o t h e r w i s e} \frac {\pi}{2} \frac {\pi}{2} \text {i n t h e r m o n e r m a l p r o x i s t e d} \ \text {. o t h e r w i s e} \frac {\pi}{2} \frac {\pi}{2} \text {o t h e r w i s e} \frac {\pi}{2} \frac {\pi}{2} \text {i n t h e r m o n e r m a l p r o x i s t e d} \ \text {o u t h e r w i s e} \frac {\pi}{2} \frac {\pi}{2} \text {i n t h e r m o n e r m a l p r o x i s t e d} \ \text {o u t h e r w i s e} \frac {\pi}{2} \frac {\pi}{2} \text {i n t h e r m o n e r m a l p r o X I T E R (o u t o f) . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . .}. \ \end{array} $$

1160（1）G

2 1557 1557 5 6000000000000000000000000000000000000000000000000000
1 10
1000 12998 877 99 88
1 1
1
1
1 1
F 11
15

6e21K

25 110
- 1500000000000000000000000000000000000000000
- 100000000000000000000000000000000000000
-

T 102020202020202020202020202020202020202020202020202020202020202020202020202020202020202020202020202020

1
P00mua

1 1
1
DOOMNEX DOOMNEX 65.0000000000000000000000000000000000000000000000
15.102677771500X

IMO2019

( x + 3) = ( x)

(1) | - | = | a^2 - b^2| .

2 1

A

15 1027 2 11 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60
S APQ = S AOB + S_ OBC
1 11000000000000000000000000000000000000000000000000000
01 5 2006 113 (1kC) 20
3 1（）

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