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At which point will f(x) attain a minima where, \(\mbox{f}(x)=\left\{\begin{array}(x^3+x^2+10x & \mbox{$x \gt 0$} \\3 sinx, & \mbox{$x \leq 0$}\end{array} \right.\)?

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MCQs on limits, trigonometric functions limits, derivatives and its intuitive idea, first and second order derivatives.
 


At which point will f(x) attain a minima where, \(\mbox{f}(x)=\left\{<br />\begin{array}<br />(x^3+x^2+10x & \mbox{$x \gt 0$} \\<br />3 sinx, & \mbox{$x \leq 0$}<br />\end{array} \right.<br />\)?






 
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