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For all x in (0,1) (a)e^x<1+x (b) (...

For all `x in (0,1)`
(a)`e^x<1+x`
(b) `(log)_e (x+1) < x`
(c)`sinx>x`
(d) `(log)_e x > x`

A

`e^(x)lt1+x`

B

`loge^(1+x)ltx`

C

`sinxgtx`

D

`log_(e)xgtx`

Text Solution

Verified by Experts

The correct Answer is:
2
`y=e^(x) or (dy)/(dx)=e^(x)`
Then equation of the tangent at x=0 is
y-1=1(x-0)or y=x+1

Graph of `y=e^(x)` always leies above the grph of y =1 1+x
Hence `e^(x)gt1+x or x gt log_(e)(1+x)` .Hence (b) is true
option (3) is wrogns as sinx `lt x for x in (0,1)`
option (4) is wrong as `xgt log_(e)` for in (0,1)
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