The value of f(x) is given only at x = 0, 13, 23 wich of the following can be used to evaluate ∫01fxdx approximately
Trapezoidal rule
Simpson's rule
Trapezoidal as well as Simpson's rule
None of the above
If f(x) = ex1 + ex, I1 = ∫f- afaxgx1 - xdx and I2 = ∫f- afagx1 - xdx, the value of I2I1 is
2
- 3
- 1
1
∫0afxdx is equal to
∫0afa - xdx
∫0afx - adx
∫0af2a - xdx
∫0afx + 2adx
A.
By the property of definite integral,∫0afxdx = ∫0afa - xdx
∫sin4xdx is equal to
183x + sin4x4 - 4sin2x2 + c
183x + sin4x4 + 4sin2x2 + c
143x + sin4x4 - 4cos2x2 + c
183x + sin4x4 + 4cos4x2 + c
∫logxdx is equal to
x + xlogx + c
xlogx - x + c
x2logx + c
1xlogx + xc
Intersection point of f1(x) = ∫2x2t - 5dt and f2x = ∫0x2tdt is
65, 3625
23, 49
13, 19
15, 125
The value of limn→∞∑r = 1n1nern is
e
e - 1
1 - e
1 + e
∫022 + x2 - xdx is equal to
π + 2
π + 32
π + 1
None of these
∫exsinexdx is equal to
- cosex + c
cosex + c
- cscex + c
∫ex1x - 1x2dx is equal to
- exx2 + c
exx2 + c
exx + c
- exx + c