If f(x) is an odd function of x, then sh...

If f(x) is an odd function of x, then show that, `int_(-a)^(a)f(x)dx=0`.

Topper's Solved these Questions

DEFINITE INTEGRAL
CHHAYA PUBLICATION|Exercise EXERCISE 9B ( SHORT ANSWER TYPE QUESTIONS )|16 Videos
DEFINITE INTEGRAL
CHHAYA PUBLICATION|Exercise EXERCISE 9B ( LONG ANSWER TYPE QUESTIONS )|17 Videos
DEFINITE INTEGRAL
CHHAYA PUBLICATION|Exercise EXERCISE 9B ( MULTIPLE CHOICE TYPE QUESTIONS )|6 Videos
COORDINATE GEOMETRY
CHHAYA PUBLICATION|Exercise JEE Advanced Archive (2016)|3 Videos
DEFINITE INTEGRAL AS AN AREA
CHHAYA PUBLICATION|Exercise Assertion-Reason Type|2 Videos

Similar Questions

Explore conceptually related problems

If f(x) is periodic function of period t show that int_(a)^(a+t)f(x)dx is independent of a.

If f(2a-x)=-f(x) , then show that, int_(0)^(2a)f(x)dx=0

If f(x) is an odd function then int_(-a)^(a)f(x) is equal to-

If f(t) is an odd function, then int_(0)^(x)f(t) dt is -

If f is an odd function, then evaluate I=int_(-a)^a(f(sinx)dx)/(f(cosx)+f(sin^2x))

If f(z) is an odd function, prove that, int_(a)^(x)f(z)dz is an even function.

It is known that f(x) is an odd function and has a period p . Prove that int_(a)^(x)f(t)dt is also periodic function with the same period.

If f(x)is integrable function in the interval [-a,a] then show that int_(-a)^(a)f(x)dx=int_(0)^(a)[f(x)+f(-x)]dx.

If f(x) is polynomaial function of degree n, prove that int e^x f(x) dx=e^x[f(x)-f '(x)+f''(x)-f'''(x)+......+(-1)^n f^n (x)] where f^n(x)=(d^nf)/(dx^n)

CHHAYA PUBLICATION-DEFINITE INTEGRAL -EXERCISE 9B (VERY SHORT ANSWER TYPE QUESTIONS)

If f(2a-x)=-f(x), then show that, int(0)^(2a)f(x)dx=0
Text Solution
|
If f(x) is an odd function of x, then show that, int(-a)^(a)f(x)dx=0.
Text Solution
|
Evaluate : int(-1)^(1)|x|dx
Text Solution
|
Evaluate : int(-(pi)/(2))^((pi)/(2))|sinx|dx
Text Solution
|
Evaluate : int(1)^(3)|x-2|dx
Text Solution
|
Prove that, int(0)^(pi)f(sinx)dx=2int(0)^((pi)/(2))f(sinx)dx.
Text Solution
|
Show that, int(0)^(pi)xf(sinx)dx=(pi)/(2)int(0)^(pi)f(sinx)dx.
Text Solution
|
Show : int(a)^(b)f(kx)dx=(1)/(k)int(ka)^(kb)f(x)dx
Text Solution
|
Show : int(0)^((pi)/(2))sinxf(sin2x)dx=int(0)^((pi)/(2))cosxf(sin2x)...
Text Solution
|
Prove that, int(a)^(b)f(a+b-x)dx=int(a)^(b)f(x)dx.
Text Solution
|
int(0)^(pi)cos^(5)xdx=0
Text Solution
|
int(0)^(8pi)sin^(6)xdx=8int(0)^(pi)sin^(6)xdx
Text Solution
|
int(-a)^(a)(xe^(x^(4)))/(1+x^(2))dx=0
Text Solution
|
int(0)^(pi)sin^(3)xcos^(7)xdx=0
Text Solution
|
int(-(pi)/(2))^((pi)/(2))sin^(7)xdx=0
Text Solution
|
int(0)^(pi)(sin4theta)/(sintheta)d theta=0
Text Solution
|
int(0)^((pi)/(2))log(tanx)dx=0
Text Solution
|
int(0)^(2pi)sin^(4).(x)/(2)cos^(5).(x)/(2)dx=0
Text Solution
|
int(-a)^(a)xsqrt(a^(2)-x^(2))dx=0
Text Solution
|
int(-1)^(1)sin^(-1).(2x)/(1+x^(2))dx=0
Text Solution
|