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question_answer1) The tangent to the curve \[y={{x}^{3}}-6{{x}^{2}}+9x+4,0\le x\le 5\] has maximum slope at \[x=k\] then find value of k.
question_answer2) If the function \[f\left( x \right)=2{{x}^{3}}-9a{{x}^{2}}+12{{a}^{2}}x+1\] where \[a>0,\] attains its maximum and minimum at p and q respectively such that \[{{p}^{2}}=q\], then find a.
question_answer3) Find the smallest value of the polynomial \[{{x}^{3}}-18{{x}^{2}}+96x\] in the interval \[\left[ 0,9 \right].\]
question_answer4) The minimum value of \[ax+by,\] where \[xy={{r}^{2}},\left( r,ab>0 \right)\] is \[\lambda r\sqrt{ab}\] then find \[\lambda \].
question_answer5) Find the minimum value of the function \[f\left( x \right)=2\,\,\left| x-2 \right|+5\,\,\left| x-3 \right|\]for all \[x\in R.\]
question_answer6) If \[y=a\,\,\log \,\,\left| x \right|+b{{x}^{2}}+x\] has its extremum values at \[x=-1\] and \[x\text{ }=\text{ }2\] then find value of \[a\text{ }+\text{ }b.\]
question_answer7) If \[ab=2a+3b,a>0,b>0,\]then find the minimum value of ab.
question_answer8) Using wire of length 20 m, boundary of a garden which is in the shape of a circular sector is made. If Area of the garden is maximum, then find the radius of the sector.
question_answer9) If maximum value of \[\frac{1}{{{x}^{2}}-3x+6}\] is \[\frac{a}{b}\]then find value of a + b.
question_answer10) Difference between the greatest and the least values of the function \[f\left( x \right)=x\left( \ell n\,x-2 \right)\] on \[\left[ 1,{{e}^{2}} \right]\] is \[\lambda {{e}^{k}}\] then find \[\lambda +k\].
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