Advertisements
Advertisements
प्रश्न
Evaluate: `int_0^π (x sin x)/(1 + cos^2x) dx`.
Advertisements
उत्तर १
I = `int_0^π (x sin x)/(1 + cos^2x) dx` ...(i)
= `int_0^π ((π - x) sin(π - x))/(1 + cos^2(π - x)) dx` ...`["Using" int_0^a f(x) dx = int_0^a f(a - x) dx]`
= `int_0^π ((π - x) sin x)/(1 + cos^2x) dx` ...(ii)
Adding (i) and (ii), we get,
2I = `int_0^π (x sin x)/(1 + cos^2x) dx + int_0^π ((π - x) sin x)/(1 + cos^2x) dx`
= `int_0^π ((x + π - x) sin x)/(1 + cos^2x) dx`
2I = `int_0^π (π sin x)/(1 + cos^2x) dx`
I = `π/2 int_0^π (sin x)/(1 + cos^2x) dx`
Let cos x = t, – sin x d x = dt
Also, x = 0, t = cos 0 = 1 and x = π, t = cos π = –1
I = `π/2 int_1^(-1) (-1)/(1 + t^2) dt`
I = `- π/2 [tan^-1 t]_1^(-1)`
= `- π/2 [tan^-1 (-1) - tan^(-1) (1)]`
= `- π/2 [- π/4 - π/4]`
= `π/2 xx (2π)/4`
I = `π^2/4`
उत्तर २
I = `int_0^π (x sin x)/(1 + cos^2x) dx` ...(i)
On Applying Property
`int_0^π f(x) dx = int_0^π f(π - x) dx`
I = `int_0^π ((π - x)sin(π - x))/(1 + cos^2(π - x)) dx`
or, I = `int_0^π ((π - x)sin x)/(1 + cos^2x) dx` ...(ii)
Adding equation (i) and equation (ii), we get
2I = `int_0^π (π sin x)/(1 + cos^2x) dx`
I = `π/2 int_0^π (sin x)/(1 + cos^2x) dx`
Let cos x = t
– sin x dx = dt
sin x dx = – dt
When x = 0
t = cos 0 = 1
When x = π
t = cos π = –1
I = `- π/2 int_1^(-1) 1/(1 + t^2) dt`
Using Property
`int_a^b f(x)dx = -int_b^a f(x)dx`
I = `π/2 int_(-1)^1 1/(1 + t^2) dt`
I = `π/2 [tan^-1 t]_(-1)^1`
I = `π/2 [tan^-1 (1) - tan^-1 (-1)]`
= `π/2 [π/4 + (3π)/4]`
= `π/2 [+ (2π)/4]`
= `π^2/4`
APPEARS IN
संबंधित प्रश्न
Find the integrals of the function:
cos 2x cos 4x cos 6x
Find the integrals of the function:
sin3 (2x + 1)
Find the integrals of the function:
sin 4x sin 8x
Find the integrals of the function:
`(1-cosx)/(1 + cos x)`
Find the integrals of the function:
sin4 x
Find the integrals of the function:
cos4 2x
Find the integrals of the function:
`(sin^2 x)/(1 + cos x)`
Find the integrals of the function:
`(cos 2x - cos 2 alpha)/(cos x - cos alpha)`
Find the integrals of the function:
`(cos 2x)/(cos x + sin x)^2`
Find the integrals of the function:
sin−1 (cos x)
`int (e^x(1 +x))/cos^2(e^x x) dx` equals ______.
Find `int (sin^2 x - cos^2x)/(sin x cos x) dx`
Differentiate : \[\tan^{- 1} \left( \frac{1 + \cos x}{\sin x} \right)\] with respect to x .
Evaluate : \[\int\limits_0^\pi \frac{x \tan x}{\sec x \cdot cosec x}dx\] .
Find `int_ (log "x")^2 d"x"`
Find `int_ (sin2"x")/((sin^2 "x"+1)(sin^2"x"+3))d"x"`
Find the area of the triangle whose vertices are (-1, 1), (0, 5) and (3, 2), using integration.
Integrate the function `cos("x + a")/sin("x + b")` w.r.t. x.
Find: `intsqrt(1 - sin 2x) dx, pi/4 < x < pi/2`
Evaluate `int tan^8 x sec^4 x"d"x`
Find `int "dx"/(2sin^2x + 5cos^2x)`
`int "dx"/(sin^2x cos^2x)` is equal to ______.
Evaluate the following:
`int ((1 + cosx))/(x + sinx) "d"x`
Evaluate the following:
`int (sin^6x + cos^6x)/(sin^2x cos^2x) "d"x`
`int (x + sinx)/(1 + cosx) "d"x` is equal to ______.
`int sinx/(3 + 4cos^2x) "d"x` = ______.
`int (cos^2x)/(sin x + cos x)^2 dx` is equal to
