Let f:R→R be given by f(x)=⎧⎪
⎪
⎪
⎪
⎪
⎪
⎪⎨⎪
⎪
⎪
⎪
⎪
⎪
⎪⎩x5+5x4+10x3+10x2+3x+1,x<0;x2−x+1,0≤x<1;23x3−4x2+7x−83,1≤x<3;(x−2)loge(x−2)−x+103,x≥3. Then which of the following option is/are correct?
A
f is increasing on (−∞,0)
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B
f′ has a local maximum at x=1
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C
f is onto
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D
f′ is NOT differentiable at x=1
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Solution
The correct options are Bf′ has a local maximum at x=1 Cf is onto Df′ is NOT differentiable at x=1 f(x)=⎧⎪
⎪
⎪
⎪
⎪⎨⎪
⎪
⎪
⎪
⎪⎩(x+1)5−2x,x<0;x2−x+1,0≤x<1;23x3−4x2+7x−83,1≤x<3;(x−2)loge(x−2)−x+103,x≥3.
f′′(1−)=limx→1−2=2 As f′′(1+)≠f′′(1−) f′(x) is not differntiable at x=1 And from the graph of f′(x) ∴f′(x) has local maximum at x=1. For x<0,f(x) is polynomial function so f(x) is continuous in (−∞,0) Also, limx→−∞f(x)=−∞ and limx→0−f(x)=1 Hence, (−∞,1)⊂Rangeoff(x) in(−∞,0) For x≥3,f(x) is continuous so domain of f(x) is R.
limx→∞f(x)=∞ and limx→3f(x)=13 [13,∞)⊂Rangeoff(x)in[3,∞) Hence, range of all the function are subset of range f(x).
Therefore range and domain of f(x) is R(−∞,∞) therefore f is onto function.
For maxima and minima, f′(x)=0⇒5(x+1)4−2=0 x=−1±4√25 so, f′(x)=0 changes sign in (−∞,0) hence f(x) is not increaing on (−∞,0)