MHT CET · Maths · Application of Derivatives
The maximum value of the function \(\mathrm{f}(x)=2 x^3-15 x^2+36 x-48\) on the set \(\mathrm{A}=\left\{x |x^2+20 \leq 9 x\right\}\) is
- A -16
- B -7
- C 16
- D 7
Answer & Solution
Correct Answer
(D) 7
Step-by-step Solution
Detailed explanation
\(\text { Let } \mathrm{f}(x)=2 x^3-15 x^2+36 x-48 \)
\( \therefore \mathrm{f}^{\prime}(x)=6 x^2-30 x+36=0 \text { at } x=3,2 \)
\( \therefore \mathrm{f}^{\prime \prime}(x)=12 x-30 \)
\( \mathrm{~A}=\left\{x \mid x^2-9 x+20 \leq 0\right\}=[4,5] \)
\( \therefore 2,3 \notin \mathrm{~A} \)
\( \therefore \text { At } x=4, \mathrm{f}(x)=-16 \text { and at } x=5, \mathrm{f}(x)=7 \)
\( \therefore \text { Maximum value of } \mathrm{f}(x) \text { is at } x=5 \)
\( \therefore \text { Maximum value of } \mathrm{f}(x) \text { is } 7.\)
\( \therefore \mathrm{f}^{\prime}(x)=6 x^2-30 x+36=0 \text { at } x=3,2 \)
\( \therefore \mathrm{f}^{\prime \prime}(x)=12 x-30 \)
\( \mathrm{~A}=\left\{x \mid x^2-9 x+20 \leq 0\right\}=[4,5] \)
\( \therefore 2,3 \notin \mathrm{~A} \)
\( \therefore \text { At } x=4, \mathrm{f}(x)=-16 \text { and at } x=5, \mathrm{f}(x)=7 \)
\( \therefore \text { Maximum value of } \mathrm{f}(x) \text { is at } x=5 \)
\( \therefore \text { Maximum value of } \mathrm{f}(x) \text { is } 7.\)
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