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DIPTI PUBLICATION ( AP EAMET)-DEFINITE INTEGRATION-EXERCISE 1B
- The value of int(-2)^(3)[1-x^(2)]dx is
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- int(0)^(2)|cos""(pix)/(2)|dx=
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- int(1//e)^(e)|logx|dx=
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- int(e^(-1))^(e^(2))|(logx)/(x)|dx=
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- int(0.5)^(4.5)[x]dx=
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- int(0)^(50)(x-[x])dx=
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- [y] is the integral part of y, then int(pi//2)^(3pi//2)[2sinx]dx=
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- int(0)^(1000)e^(x-[x])dx=
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- int(0)^(100)sin(x-[x])pidx=
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- If [x] denotes the greatest intger function then the velue of int(0.5)...
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- Evaluate underset(-pi//2)overset(pi/2)int sin|x| dx
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- int(0)^(1)|sin2pix|dx=
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- int(0)^(pi//4)[sqrt([1-sin2x)/(1+sin2x)]dx=
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- int(0)^(100pi)sqrt(1-cos2x)dx=
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- int(0)^(pi)|costheta-sintheta|d""theta
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- The integral int(0)^(x) sqrt(1+4 sin^(2). x/2 - 4 sin. x/2 )dx equals
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- int(-1)^(3//2)|xsinpix|dx
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- Lt(xto0)((int(0)^(x)sin^(3)x)/(x^(4)))=
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- int(0)^(pi//3) |tan x - 1|dx=
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- Lt(xto0)(x^(2))/(int(0)^(x)Tan^(-1)tdt)
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