The value of ∫-π2π2sin2x1+2xdx is: from Math

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 Multiple Choice QuestionsMultiple Choice Questions

31.

If straight f left parenthesis straight x right parenthesis space equals space fraction numerator straight e to the power of straight x over denominator 1 plus straight e to the power of straight x end fraction. space straight I subscript 1 space equals space integral subscript straight f left parenthesis negative straight a right parenthesis end subscript superscript straight f left parenthesis straight a right parenthesis end superscript space xg open curly brackets straight x open parentheses 1 minus straight x close parentheses close curly brackets dx space and space straight I subscript 2 space equals space integral subscript straight f left parenthesis negative straight a right parenthesis end subscript superscript straight f left parenthesis straight a right parenthesis end superscript space straight g open curly brackets straight x open parentheses 1 minus straight x close parentheses close curly brackets dx then the value of I2/I1 is

  • 2

  • -2

  • 1

  • 1

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32.

The value of -π2π2sin2x1+2xdx is:

  • π/4

  • π/8

  • π/2


A.

π/4

I = -π2π2sin2 x dx1 + 2x ... (i)Also, I = -π2π22x sin2 x dx1 + 2x .... (ii)Adding (i) and (ii)2I = -π2π2 sin2 xdx2I = 20π2sin2 x dx I= 0π2sin2 xdx .... (iii)I =  0π2cos2 xdx .... (iv)Adding (iii) and (iv)2I =    0π2dx = π2I = π4


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33.

The Integralsin2 x  cos2 x (sin5 x + cos3 x sin2 x + sin3 x cos2 x + cos 5x)2dx is equal to

(where C is a constant of integration)

  • -11+ cot3 x  + C

  • 13(1 + tan3 x)  + C

  • -13(1 + tan3 x ) +C

  • 11+ cot3 x  + C


34.

coslogxdx = F(x) +C, where C is an arbitrary constant. Here, F(x) is equal to 

  • xcoslogx +sinlogx

  • xcoslogx - sinlogx

  • x2coslogx +sinlogx

  • x2coslogx - sinlogx


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35.

x2 - 1x4 + 3x2 + 1dx(x > 0) is

  • tan-1x + 1x +C

  • tan-1x - 1x +C

  • logex + 1x - 1x + 1x + 1 + C

  • logex - 1x - 1x - 1x + 1 + C


36.

Let I = 1019sinx1 + x8dx, then

  • I < 10- 9  

  • I < 10- 7  

  • I < 10- 5  

  • I > 10- 7  


37.

Let I0nxdx and I20nxdx, where [x] and {x} are integral and fractional parts of x and n  N - {1}. Then, I1/Iis equal to

  • 1n - 1

  • 1n

  • n

  • n - 1


38.

The value of limnnn2 + 12 +nn2 + 22 + ... +12n is

  • 4

  • π4

  • π4n

  • π2n


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39.

The value of 0100ex2dx

  • is less than 1

  • is greater than 1

  • is less than or equal to 1

  • lies in the closed interval [1, e]


40.

0100ex - xdx is equal to

  • e100 - 1100

  • e100 - 1e - 1

  • 100(e - 1)

  • e - 1100


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