∫116x2 + 9dx is equal to
13tan-14x3 + c
14tan-14x3 + c
112tan-14x3 + c
112tan-13x4 + c
The value of ∫4711 - x2x2 + 11 - x2dx is
1
1/2
3/2
0
∫tanx + cotxdx
2tan-1tanxtanx + C
2tan-1tanx - 12tanx + C
tanx2 . tan-1cotx + 12tanx + C
∫x2xsinx + cosx2dx is equal to
sinx + cosxxsinx + cosx + C
xsinx - cosxxsinx + cosx + C
sinx - xcosxxsinx + cosx + C
None of these
∫0xxdx1 + cosαsinx, 0 < α < π is equal to
παsinα
παcosα
πα1 + sinα
πα1 - cosα
∫- π2π2cosx1 + exdx
- 1
∫0π2dx1 + tanx is equal to
π
π2
π3
π4
By Simpson rule taking n = 4, the value of the integral ∫0111 + x2dx is equal to
0.788
0.781
0.785
None of the above
The value of ∫0πlog1 + cosxdx is
- π2log2
πlog12
πlog2
π2log2
The value of ∫344 - xx - 3dx is
π16
π8
B.
Let I = ∫344 - xx - 3dx = ∫34- x2 + 7x - 12dx = ∫34- x2 - 7x + 494 - 494 - 12dx = ∫34- x - 722 + 494 - 12dx = ∫3414 - x - 722dxLet t = x - 72 ⇒ dt = dx∴ Upper limit = 12 and lower limit = - 12 = ∫- 1212122 - t2dt = 2∫012122 - t2dt = 2t214 - t2 + 18sin-12t012 = 20 + 18 × π2 = π8