let `f(x)=(cos^-1(1-{x})sin^-1(1-{x}))/sqrt(2{x}(1-{x}))` where `{x}` denotes the fractional part of `x` then

Question

let `f(x)=(cos^-1(1-{x})sin^-1(1-{x}))/sqrt(2{x}(1-{x}))` where `{x}` denotes the fractional part of `x` then

let `f(x)=(cos^-1(1-{x})sin^-1(1-{x}))/sqrt(2{x}(1-{x}))` where `{x}` denotes the fractional part of `x` then
A. `(1)/(96)`
B. `(1)/(48)`
C. `(1)/(24)`
D. 1

Monjur Alahi

4 views

2025-01-04 04:42

1 Answers

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Salim Ahmed Kawsar · Accepted Answer · 2023-02-05T15:29:48+06:00

Correct Answer - D
We have `f(x)=(sin^(-1)(1-{x})cos^(-1)(1-{x}))/(sqrt(2{x})(1-{x}))`
`:.underset(xto0^(+))limf(x)=underset(hto0)limf(0+h)`
`=underset(hto0)lim(sin^(-1)(1-{0+h})cos^(-1)(1-{0+h}))/(sqrt(2{0+h})(1-{0+h}))`
`=underset(hto0)lim(sin^(-1)(1-h)cos^(-1)(1-h))/(sqrt(2h)(1-h))`
`=underset(hto0)lim(sin^(-1)(1-h))/((1-h))underset(hto0)lim(cos^(-1)(1-h))/(sqrt(2)h)`
In second limit, put `1-h=costheta.` Then
`underset(xto0^(+))limf(x)=underset(hto0)lim(sin^(-1)(1-h))/((1-h))underset(hto0)lim(cos^(-1)(costheta))/(sqrt(2(1-costheta)))`
`=underset (hto0)lim(sin^(-1)(1-h))/((1-h))underset(thetato0)lim(theta)/(2sin(theta//2))(becausethetagt0)`
`=sin^(-1)1xx1=pi//2`
and `underset(xto0^(-))limf(x)=underset(hto0)limf(0-h)`
`=underset(hto0)lim(sin^(-1)(1-{0-h})cos^(-1)(1-{0-h}))/(sqrt(2{0-h}")")(1-{0-h}))`
`=underset(hto0)lim(sin^(-1)(1+h-1)cos^(-1)(1+h-1))/(sqrt(2(-h+1))(1+h-1))`
`=underset(hto0)lim(sin^(-1)h)/(h)underset(hto0)lim(cos^(-1)h)/(sqrt(2(1-h)))`
`=1(pi//2)/(sqrt(2))=(pi)/(2sqrt(2))`