Advertisements
Advertisements
प्रश्न
Evaluate: `int_ e^x ((2+sin2x))/cos^2 x dx`
उत्तर
I = `int_ e^x ( (2)/(cos^2 x) + (2sin x cos x)/(cos^2 x))dx`
= `int_ e^x ( 2 sec^2 x + 2 tan x)dx`
= `2int_ e^x (sec^2 x + tan x)dx`
= `2[int_ e^x sec^2 x dx + int_ e^x tan x dx]`
= `2[ e^x int_ sec^2 x dx - int_ {d/dx e^x int_ sec^2 x dx } dx + int_ e^x tan x dx ] + c `
= `2[ e^x tan x - int_ e^x tan x dx + int_ e^x tan x dx ] + c`
= `2 e^x tan x + c`
APPEARS IN
संबंधित प्रश्न
Evaluate :`int_0^(pi/2)1/(1+cosx)dx`
Evaluate :
`∫_(-pi)^pi (cos ax−sin bx)^2 dx`
Evaluate the integral by using substitution.
`int_0^2 xsqrt(x+2)` (Put x + 2 = `t^2`)
Evaluate of the following integral:
Evaluate of the following integral:
Evaluate of the following integral:
Evaluate:
Evaluate the following integral:
Evaluate the following integral:
Evaluate the following integral:
Evaluate each of the following integral:
Evaluate each of the following integral:
Evaluate each of the following integral:
Evaluate each of the following integral:
Evaluate each of the following integral:
Evaluate the following integral:
Evaluate the following integral:
Evaluate
\[\int\limits_0^\pi \frac{x}{1 + \sin \alpha \sin x}dx\]
Evaluate the following integral:
Evaluate :
Find : \[\int e^{2x} \sin \left( 3x + 1 \right) dx\] .
Find : \[\int\frac{x \sin^{- 1} x}{\sqrt{1 - x^2}}dx\] .
Evaluate: `int_1^5{|"x"-1|+|"x"-2|+|"x"-3|}d"x"`.
`int_0^(pi4) sec^4x "d"x` = ______.
Evaluate the following:
`int ("e"^(6logx) - "e"^(5logx))/("e"^(4logx) - "e"^(3logx)) "d"x`
Each student in a class of 40, studies at least one of the subjects English, Mathematics and Economics. 16 study English, 22 Economics and 26 Mathematics, 5 study English and Economics, 14 Mathematics and Economics and 2 study all the three subjects. The number of students who study English and Mathematics but not Economics is
If `int x^5 cos (x^6)"d"x = "k" sin (x^6) + "C"`, find the value of k.
