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This section includes 7 InterviewSolutions, each offering curated multiple-choice questions to sharpen your Current Affairs knowledge and support exam preparation. Choose a topic below to get started.
| 1. |
25 In the figure Bo and Co are bisectors of interior ofBOC 90+BAC0.ZB and L C intersecting at O. Show that |
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Answer» As we know A + B + C = 180So, B + C = 180 - AOr, (B/2) + (C/2) = 90 - (A/2) ....(1) Now think in triangle BOC,we have three angles, OBC, BOC and OCBOBC = (B/2)OCB = (C/2)Let BOC = X So, X + (B/2) + (C/2) = 180From equation (1) X + 90 - (A/2) = 180X = 90 + A/2 (Proved !!!) |
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| 2. |
If A, B, C, D be the angles of a quadrilateral, thentan A + tan B + tan C+ tan D /cot A + cot B+cot C+ cot D |
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| 3. |
\triangle A B C, \text { prove that } \frac{b-\c}{a}=\frac{\tan \frac{B}{2}-\tan \frac{C}{2}}{\tan \frac{B}{2}+\tan \frac{C}{2}} |
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| 4. |
sin xdxsin(x + Îą) |
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| 5. |
(i) cos4 Ď + cos4 _ + cos4 5Ď + cos4 |
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| 6. |
find sin34°+cos64°-cos4 |
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Answer» Sin34° + Cos64° - Cos4°= Sin34° + Cos(34 + 30)° - Cos(34 - 30)°= Sin34° + (-2Sin34°Sin30°)= Sin34° - 2 × Sin34° × 1/2= Sin34° - Sin34°= 0 (Proved) |
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| 7. |
integration of sin⁴xdx |
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| 8. |
c sin xdxsin(x + Îą)Sin y |
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| 9. |
(1) Prove that, cos”A+60s(A + 5) + cos?(A-1)-(ii) Prove that, cos’A+cos?26 |
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Answer» Using this, cos²x = {1 + cos(2x)}/2cos²(x + π/3) = {1 + cos(2x + 2π/3)}/2 and cos²(x - π/3) = {1 + cos(2x - 2π/3)}/2 ii) Hence, left side of the given one is: = {1 + cos(2x)}/2 + {1 + cos(2x + 2π/3)}/2 + {1 + cos(2x - 2π/3)}/2 = (3/2) + (1/2)[cos(2x) + cos(2x + 2π/3) + cos(2x - 2π/3)] = (3/2) + (1/2)[cos(2x) + 2cos(2x)*cos(2π/3)][Since cos(A+B) + cos(A-B) = 2cosA*cosB] = (3/2) + (1/2)[cos(2x) - cos(2x)] [Since cos(2π/3) = -1/2] = 3/2 = Right side HENCE PROVED |
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| 10. |
101)b)lf A = {3,6,9,12,15,18,21} B = {4,8,12,16,20}C = {2,4,6,8,10,12,14,16} D = {5,10,15,20} findi) A-B ii)A-C iii)A-D iv)B-A v)C-A vi)D-A vii)B-C viii)B-Dix)C-B x) D-B ? |
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Answer» Given:A = {3, 6, 12, 15, 18, 21}, B = {4, 8, 12, 16, 20}, C = {2, 4, 6, 8, 10, 12, 14, 16} and D = {5, 10, 15, 20}i A−BÂ = {3, 6, 15, 18, 21}ii A−C = {3, 15, 18, 21}iii A−D = {3, 6, 12, 18, 21}iv B−A = {4, 8, 16, 20}v C−A = {2, 4, 8, 10, 14, 16}vi D−A = {5, 10, 20}vii B−C = {20}viii B−D = {4, 8, 12, 16} |
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| 11. |
Prove that: 1. Cosecel + CosecCot2e1 + CosecProve that 1 +Cosece |
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| 12. |
\begin{array} { c } { \text { If the points } A ( a , 0 ) , B ( 0 , b ) \text { and } P ( x , y ) \text { are collinear, using slopes, prove thal } } \\ { \frac { x } { a } + \frac { y } { b } = 1 } \end{array} |
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| 13. |
ciUt uicl Ceues.Prove that if chords of congruent circles subtend equal angles at their centresthe chords are equal. |
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| 14. |
\sqrt { \frac { \sec \theta - 1 } { \sec \theta + 1 } } + \sqrt { \frac { \sec \theta + ! } { \sec \theta - 1 } } = 2 \csc \theta |
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Answer» thanks sir |
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| 15. |
a sec A+ b sec B+c sec C = a sec A tan B tan C. |
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| 16. |
differentiateax⁴+bx³+cx²-dx-e |
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| 17. |
EST 12 : 져. H.郭ส(120, 504, 882): |
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Answer» 120=2*2*2*3*5504=2*2*2*3*3*7882=2*3*3*7*7 so LCM=2*2*2*3*3*5*7*7=17640 |
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| 18. |
Differentiate (1+x)/ e^x |
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| 19. |
2Evaluate I J cos4 xdx |
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| 20. |
Prove that sin6(1 + tan0) + cos6(1 + cote) = secθ + cos eco |
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| 21. |
x tan xdx |
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Answer» first second ke rule se lagaiye sir aa jayega pahle ko second aur dusre ko first |
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| 22. |
b) Evaluate : f-tanb) Evaluate :\int_{1} \frac{x^{2} \tan ^{-1} x^{3}}{1+x^{6}} d x |
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Answer» make substitution of t = arctan((x)^3))herearctan refers to tan inverse thanks |
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| 23. |
(a) 14Clthed the area of the following circles, given thal.(a) radius(c) radius(b) diat14 mm (Take Ď5 cmT)s circulanarsheet is 154 m, find its radius. Also fin |
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| 24. |
17,.1 Prove thatcote-tan0=sinecose |
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Answer» CosA/sinA - sinA/cosA=(2cos2A-1)/sinAcosAlhs:cos^2A-sin^2A/sinAcosA cos^2A-1+1-sin^2A/sinAcosAcos^2A-1+cos^A/sinAcosA 2cos^2a-1/sinAcosA=rhs |
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| 25. |
15. A PQR में PR-8cm, QR4cm, और PL-5 cin, find QN1(छ) 3 सेमी(क) 3 सेंमी(ग) 5 से0मी0(ख) 25 से0मी0| (घ) 520 से0मी00) 25 से मीठ |
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Answer» Pleaseeeeeeeee33 like answer is (B) 2.5 cmplease like my answer thanks answer is (B) 2.5 cm please like my answer option (b) 2•5 is the right answer ANSWER IS 2. 5cm (option b) |
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| 26. |
angle. Prove thal ut Ithe given figure of square ABCD, B9. R and S are the midpoints of AB,BC, CD and DA respectively. Find thearea of unruled portion.A.14 em |
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| 27. |
1. The graph of y- plx) is given below, find the number of zeroes of p(x)eachSol. It is clear from the ograch that curve ir |
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Answer» no. of zeroes are 3 no. of zeroes of p(x) : 3 |
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| 28. |
differentiate e^√2logx |
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| 29. |
Prove that sin1tane) + cos0(1 + cote) seccosec6 |
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Answer» Thanku😊 |
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| 30. |
8. Evaluate : tanRICO |
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| 31. |
Evaluate : tan 650-cot 25°- |
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Answer» As we know that tan(90- theta) = cot theetaso tan(90-65} = cot 25°cot 25°/cot 25°so answer= 1please let me know if you need any helplike it |
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| 32. |
Differentiate e from definitio |
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| 33. |
differentiateyvi? E |
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Answer» Idk who you would juqqkiqkiq y= x^2 + 1/y y^2 = x^2 y +1 differentiate both side 2y y' = 2xy + x^2 y' 2yy' - x^2 y' = 2xy y'( 2y - x^2) = 2xy y'= 2xy/(2y - x^2) |
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| 34. |
Q.6. (A) Evaluate tan xdx |
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| 35. |
cos0 — \/_2, then evaluate: tan© + ८019 |
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| 36. |
Eimiae(ii)xcos θ-ysin θ =a.xsin θ + y cos8-b |
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| 37. |
० - TafE xcos =1 A ysinb =1 हो तो ६८008 का मान XM |
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Answer» xcosθ = 1ysinθ = 1 ysinθ/xcosθ = 1ytanθ/x = 1tanθ = x/y |
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| 38. |
It is given thal pL5. Find m so that roots of the equation (4 + m) x- (6. Show that the roots of the equation x2 + 2 (3a + 5) x + 2 (9 a2+25)0 are complex unlessho roots of the equation |
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| 39. |
tanthat30. Prove thal+-cote1-tan 8= 1 + tan 0 + cote-cotoOr |
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| 40. |
EXAMPLE 3.14Differentiate e from first principle. |
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| 41. |
The value of 2 tan (tan""x+ tan"'*") is2x(B) 1+ x2(C) 2x(D) of thes |
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Answer» c) is the correct answer you are great 😊😊😊 |
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| 42. |
Find dyfor the followingICOS 2X - sin 2xLsin 2x + cos2x. |
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Answer» Please accepted as best please |
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| 43. |
Evaluate tan (2x)dx |
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| 44. |
Differentiate xcos x from the first principle. |
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| 45. |
the gas which turn lime water mily is |
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Answer» the gas which turns lime milky is carbon dioxide |
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| 46. |
NOTESShow thal the Line segmen |
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Answer» Thanks for helping |
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| 47. |
find derivation of cos x by first principle method |
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Answer» 1 2 3 |
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| 48. |
sin 2x by first principle |
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| 49. |
tan 2x by first principle |
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| 50. |
sin x/ x by first principle |
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