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Coordinate of mid point (x,y)x = (x1 +x2)/2y =(y1 +y2)/2A/qx =(-5 + (-1))/2 = -3⇒a/3 = -3⇒a =-9y = (4+0)/2 = 2coordinate of mid point = (-3,2)so,a= -9

Ar(∆ABC)/Ar(∆PQR)=(AB/PQ)^2hencearea ratios will be (1/3)^2=1/9

(-a)² + p·(-a) + q = 0 --> a² -ap + q = 0(-a)² + l·(-a) + m= 0 --> a² -al + m = 0Since they both equal 0, you can set them equal to each other:a² -ap + q = a² -al + m-ap + q + -al + mal - ap = m-qa(l-p) = m-qa=m-q/l-p

624 Marbles sunil have in altogether

rad marbels Sunil have=368yellow marbels Sunil have=256the total marbels Sunil have= 624

ΔABC ~ Δ PQR & AB/PQ = 1/3ar(ΔABC)/ar( Δ PQR )= AB²/ PQ² [The ratio of the areas of two similar triangles is equal to the square of the ratio of their corresponding sides.]ar(ΔABC)/ar( Δ PQR ) = 1²/3² [Given =AB/PQ = ⅓]ar(ΔABC)/ar( Δ PQR ) = 1/9Hence, the Area of ΔABC/Area of ΔPQR = 1/9

First take L. C. M. OF 5 & 7 = 35Now mark 35 as common difference (d)First number which is divisible by 35 in between 300 & 650 is (a) = 315Last number which is divisible by 35 is (an) = 630Therefore, an = a + (n - 1)d630 = 315 + (n - 1)35630 - 315 = 35(n - 1)315 = 35 (n - 1)315 / 35 = n - 19 = n - 19 + 1 = n10 = nTherefore, their are 10 numbers which are divisible by both 5 & 7 which lies between 300 & 650

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5cos= 6sintan = sin/cos= 5/6

2) Taking cos commanso12tan -3/12tan +1

= 60/6-3/60/6+1= 7/11answer

Height of 5 boys152cm, 170cm, 156cm, 164cm, 158cm Mean = (152+170+156+164+158)/5 = 800/5 = 160cm

ABCD is the given rhombus.

Side AB = BC = CD = DA = 5cm

One diagonal AC = 8cm

In right ∆ABD, we have to calculate diagonal BD

Using pythagoras theorem,

BD^2 = AB^2 + AD^2 = (5)^2 + (5)^2 = 25+25BD = 25√2cm

area of rhombus = 1/2* (8)* (25√2) = 4*25√2 = 100√2 cm^2

the question answer is 1,188

Mean height = sum of all heights/no. of boys = (152 + 170 + 156 + 164 + 158)/5 = 800/5 = 160cm

mean = average of 5 heights = (152+170+156+164+158)/5 = 800/5 = 160cm

For midpoint,x=x1+x2/2 a/3 = -5-1/2a=3(-6) a= -18The value of a is -18.

RHS = (2s - 1)² = (2s)² + (1)² - 2*1*2x = 4s² - 4s + 1 = LHS

650 = 2×5×5×13 1170 = 2×3×3×5×13 HCF = 2×5×13 = 130

20/100*650=130 is the answer

130 is the correct and best answer

10%=650/10=65 . 20%=10%× 2=65×2=130

20/100=20/650=2*65=130 answer

See the diagram.we need to find 2y.

In the right angled triangle AMC6² = x² + y²⇒ y² = 36-x²

In the right angled triangle OMC5² = y² + (5-x)²⇒ 25 = (36-x²) + 25 + x² - 10x⇒ 25 = 36 - x²+ 25 + x² - 10x⇒ 0 = 36 - 10x⇒ x = 36/10 = 3.6

y =√(36-3.6²) =√23.04 = 4.8 cmBC = 2y = 4.8×2 = 9.6 cm

is this line segment

thank you

add all the three .you will get a+b+c/a+b+c hence answer will be 1

Equationwill be(x-0)^2+(y-1)^2= 4^2

let a = k

cost of 15 benches=37.5cost of one bench =37.5/15=2.5rs

170000000000000000000000000000 cm

135cm is the right answer........

i think the answer is 40because =170-130=40if you don't mind if it is wrong please give me right answer

120 is the right answer

135 cm is the right answer

125.77cm is the correct answer

135 is the correct one

130 is the right answer

40 is the right answer

170000000000000000000000000cm

the correct answer is 135CM

135 is the correct answer

150 is right answer of your question

170 is the correct answer

The right answer is 135cm

Perimeter = 2(l+b)=> 130 = 2(l+30)=> 65 = l+30=> l = 35 cm.

Area = l*b= 30*35= 1050 sq cm

6.3 rupeessheila-2×3.75=7.5Heena-7. 5-1.20=6.3

sheila 2×3.75=7.5heena 7.5-1.20=6.3 answer.

6.3 is correct answer

Henna have 6.3 money

is the best answer.

AB and AC are two equal chords of a circle, therefore the centre of the circle lies on the bisector of ∠BAC.

⇒ OA is the bisector of ∠BAC.

∴ P divides BC in the ratio = 6 : 6 = 1 : 1.

⇒ P is mid-point of BC.

⇒ OP ⊥ BC.

In ΔABP, by pythagoras theorem,

AB2= AP2+ BP2

⇒ BP2= 62- AP2.............(1)

In right triangle OBP, we have

OB2= OP2+ BP2

⇒ 52= (5 - AP)2+ BP2

⇒ BP2= 25 - (5 - AP)2...........(2)

Equating (1) and (2), we get

62- AP2= 25 - (5 - AP)2

⇒ 11 - AP2= -25 - AP2+ 10AP

⇒ 36 = 10AP

⇒ AP = 3.6 cm

putting AP in (1), we get

BP2= 62- (3.6)2= 23.04

⇒ BP = 4.8 cm

⇒ BC = 2BP = 2× 4.8 = 9.6 cm

1/(OA)² + 1/(TA)² = 1/36

Multiply both sides by (OA)² (TA)²(TA)² + (OA)² = (OA)² (TA)² / 36

Since TA is a tangent of the circle, then TA is perpendicular to OA, so △OAT has a right angle at A. By Pythagorean theorem:(TA)² + (OA)² = (OT)²

Therefore:(OT)² = (OA)² (TA)² / 36OT = OA * TA / 6

AB is perpendicular to OT. Therefore, AC is perpendicular to OTSince △OAT is a right triangle, dropping perpendicular from right angle A to side OT (at C) creates 2 right triangles that are both similar to △OAT

△OAT ~ △OCA ~ △ACT

By similar triangles:AC/OA = TA/OTAC = OA * TA / OTAC = OA * TA / (OA * TA / 6)AC = 6

AB = 2 * ACAB = 12

Option 2) 12 cm is correct.