Advertisements
Advertisements
प्रश्न
If `d/dx(F(x))=1/(e^x+1)`, then find F(x) given that F(0) = log `1/2`.
योग
Advertisements
उत्तर
Given
`d/dx(F(x))=1/(e^x+1)`
F(x) = `int1/(e^x+1)dx`
Let ex = t
ex dx = dt
dx = `dt/e^x`
= `dt/t`
F(x) = `int1/(t(t+1))dt`
`1/(t(t+1))=A/t+B/(t+1)`
I = A (t +1) +Bt
I = At + A + Bt
A + B = 0
A = 1
B = –1
F(x) = `int1/(t(t+1))dt`
= `intdt/t-intdt/((t+1))`
= log|t| – log|t + 1| + C
= `log|t/(t+1)|+C`
F(x) = `log|e^x/(e^x+1)|+C`
At F(0) = log `1/2` ; x = 0
F(0) = `log|e^0/(e^0+1)|+C`
= `log 1/2+C`
⇒ `log 1/2=log1/2+C`
⇒ C = 0
F(x) = `log|e^x/(e^x+1)|`
shaalaa.com
क्या इस प्रश्न या उत्तर में कोई त्रुटि है?
