∫0πxdxa2cos2x + b2sin2xdx is equal to
π2ab
πab
π22ab
The differential equation for which sin-1(x) + sin-1(y) = c is given by
1 - x2dy + 1 - y2dx = 0
1 - x2dx + 1 - y2dy = 0
1 - x2dx - 1 - y2dy = 0
1 - x2dy - 1 - y2dx = 0
A.
Here, we have sin-1x + sin-1y = cDifferentiating both sides, we get dx1 - x2 + dy 1 - y2 = 0⇒ 1 - y2dx + 1 - x2dy1 - x2 - 1 - y2 = 0⇒ 1 - x2dy + 1 - y2dx = 0
∫ex1 + sinx1 + cosxdx is equal to
exsec2x2 + c
extanx2 + c
exsecx2 + c
extanx + c
∫1 + sinx4dx is equal to
8sinx8 + cosx8 + C
8sinx8 - cosx8 + C
8cosx8 - sinx8 + C
18sinx8 - cosx8 + C
∫0∞xdx1 + x1 + x2 is equal to
π2
0
1
π4
If In = ∫logxndx, then In + nIn - 1 is equal to
xlogxn
nlogxn
logxn - 1
The area included between the parabolas x2 = 4y and y2 = 4x is (in square units)
43
13
163
83
Multiple Choice Questions
Switch
