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(2^3+3^2)^-11/8+91/17

(2^2+3^3)^-11/4+91/13

1267938337+639399373639939

91+2=93 is the answer

91+2=93(ans.)........

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101×2202

102 is the right answer of the following

uska focus bhi 2 cm hoga bhai

uska focas length 2 hoga

2 cm will be the focus of the lence

A=a^2d=√2aA=1/2d^2=1/2 (20)^2=200cm^2

√3+2.236/3-2.236=√5.226/0.744=√5.97=2.44335

Rationalize,√[(3+√5)/3+√5)/(3-√5)(3+√5)]

9+5+6√5/414+6√5/47+3√5/2

√(7+3√5/2)Put √5=2.236=√6.854=2.618

wrong answer

first term,a = 24

common difference,d = 21-24 = -3

let the number of terms to get sum 78 is n.

Sn = n/2 (2a +( n-1) d)

78 = n/2(48+ (-3)n + 3)

78 = n/2(51 + (-3)n)

78*2=n (51+ (-3)n)

156= 51n + -3n^2

3n^2-51n+156=0

n^2 - 17n +52 =0

n^2-13n-4n +52 =0

n(n-13)-4(n-13)=0

(n-4)(n-13) =0

n = 4,13

Solving the quadratic equation, we get n=4 and n=13.

So you can take either 4 terms or 13 terms to get the sum 78.

first term,a = 24

common difference,d = 21-24 = -3

let the number of terms to get sum 78 is n.

Sn = n/2 (2a +( n-1) d)

78 = n/2(48+ (-3)n + 3)

78 = n/2(51 + (-3)n)

78*2=n (51+ (-3)n)

156= 51n + -3n^2

3n^2-51n+156=0

n^2 - 17n +52 =0

n^2-13n-4n +52 =0

n(n-13)-4(n-13)=0

(n-4)(n-13) =0

n = 4,13

Solving the quadratic equation, we get n=4 and n=13.

So you can take either 4 terms or 13 terms to get the sum 78.

Tysm

HCF will be81 = 3⁴237 = 3× 79so HCF is 3

h c f=3

237 + 153 = the answer was 390

b) 1.08 mc) 249 cmd) 0.5 me) 630 mf) 0.07 m

Let the first term and the common difference of the A.P areaanddrespectively.

Since the A.P contains 37 terms. So, the middle most term is (37+1)/2 th term = 19thterm.

Thus, three middle most terms of this A.P.are 18th, 19thand 20thterms.

Givena18+a19+a20= 225

⇒ (a+ 17d) + (a+ 18d) + (a+ 19d) = 225

⇒ 3(a+ 18d) = 225

⇒a+ 18d= 75

⇒a= 75 – 18d… (1)

According to given information

a35+a36+a37= 429

⇒ (a+ 34d) + (a+ 35d) + (a+ 36d) = 429

⇒ 3(a+ 35d) = 429

⇒ (75 – 18d) + 35d= 143

⇒ 17d= 143 – 75 = 68

⇒d= 4

Substituting the value ofdin equation (1), it is obtained

a= 75 – 18 × 4 = 3

Thus, the A.P. is 3, 7, 11, 15 …

Let the first term and the common difference of the A.P areaanddrespectively.

Since the A.P contains 37 terms. So, the middle most term is (37+1)/2 th term = 19thterm.

Thus, three middle most terms of this A.P.are 18th, 19thand 20thterms.

Givena18+a19+a20= 225

⇒ (a+ 17d) + (a+ 18d) + (a+ 19d) = 225

⇒ 3(a+ 18d) = 225

⇒a+ 18d= 75

⇒a= 75 – 18d… (1)

According to given information

a35+a36+a37= 429

⇒ (a+ 34d) + (a+ 35d) + (a+ 36d) = 429

⇒ 3(a+ 35d) = 429

⇒ (75 – 18d) + 35d= 143

⇒ 17d= 143 – 75 = 68

⇒d= 4

Substituting the value ofdin equation (1), it is obtained

a= 75 – 18 × 4 = 3

Thus, the A.P. is 3, 7, 11, 15 …

2^3×3^2×5=8×9×5=360; 2^3×3=27; 2x3x5=30;

x = a sin theta : y = b tan theta ....(Given)L.H.S. = a²/x² - b²/y² = a²/(a sin theta)² - b²/(b tan theta)²a² and b² are cancelled and then we get1/sin² theta - 1/sin² theta/cos² theta ...[∴ tan theta = sin theta/cos theta]1/sin² theta - cos² theta/sin² theta= (1-cos² theta)/sin² theta ....[∴ sin² theta + cos² theta = 1]sin² theta/sin² theta = 1= R.H.S⇒ a²/x² - b²/y²Hence proved.

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n=50 It is an AP. So, tn=a+(n-1)d t3=a+(3-1)d 12 =a+2d (1) Last term is 106. t50=a+(50-1)d 106=a+49d (2) From (1) and (2), 106=12-2d+49d 94=47d d=94/47 =2 a= 12-2d =12-2(2) =8 a=8 So t29=a+(n-1)d =8+(29-1)2 =8+28(2) =8+56 =64.

Since, 237 > 81

On applying Euclid’s division algorithm, we get

237 = 81 × 2 + 75 ...(i)

81 = 75 × 1 + 6 ...(ii)

75 = 6 × 12 + 3 ...(iii)

6 = 3 × 2 + 0 ...(iv)

Hence, and HCF (81, 237) = 3. 1 Write 3 in the form of 81x + 237y, move backwards

3 = 75 – 6 × 12 [From (iii)]= 75 – (81 – 75 × 1) × 12 [Replace 6 from (ii)]

= 75 – (81 × 12 – 75 × 1 × 12)= 75 – 81 × 12 + 75 × 12= 75 + 75 × 12 – 81 × 12= 75 ( 1 + 12) – 81 × 12= 75 × 13 – 81 × 12 = 13(237 – 81 × 2) – 81 × 12 [Replace 75 from (i)]

= 13 × 237 – 81 × 2 × 13 – 81 × 12= 237 × 13 – 81 (26 + 12)= 237 × 13 – 81 × 38= 81 × (– 38) + 237 × (13) = 81x + 237y

Hence, x = – 38 and y = 13

By Euclid's Division Algorithm,

237=81(2)+(75)

81=75(1) + (6)

75=6(12)+(3)

6=3(2)+(0)

Hcf =3

Expressing it in the form of 237x+81y=HCF

3=75-6(12) { From 2nd last step}

3=75-(81-75)(12) {Substituting}

3=75-(81*12-75*12)

3=75-81*12+75*12

3=75(13)-81(12)

3=(237-81*2)(13)-81(12)

3=237(13)-81(38)

3=237(13)+81(-38) {we need an expression in the form 237x + 81y }

Therefore, x =13 , y =- 38

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By Euclid's Division Algorithm,

237=81(2)+(75)

81=75(1) + (6)

75=6(12)+(3)

6=3(2)+(0)

Hcf =3

Expressing it in the form of 237x+81y=HCF

3=75-6(12) { From 2nd last step}

3=75-(81-75)(12) {Substituting}

3=75-(81*12-75*12)

3=75-81*12+75*12

3=75(13)-81(12)

3=(237-81*2)(13)-81(12)

3=237(13)-81(38)

3=237(13)+81(-38) {we need an expression in the form 237x + 81y }

Therefore, x =13 , y =- 38

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we know krke h vo frmula h

Yes that's the formula.you could use it.

thanx mam

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