Find Maxima minima and point of inflection of following curves . y =x^

1.	Find Maxima minima and point of inflection of following curves . y =x^3-2
Answer» align="absmiddle" alt="\sf\huge\bold{\underline{\underline{{Solution}}}}" class="latex-formula" id="TexFormula1" src="HTTPS://tex.z-dn.net/?f=%5Csf%5Chuge%5Cbold%7B%5Cunderline%7B%5Cunderline%7B%7BSolution%7D%7D%7D%7D" title="\sf\huge\bold{\underline{\underline{{Solution}}}}"> For point of inflexion the function has neither maxima nor minima this is called point of inflexion. Concept Here ,f(x) is given so,we first find its DERIVATIVE and make equal to zero and hence find VALUE of x and then find its double derivatives and put value of x here.If the function is greater than zero then it's minima or if less than zero then it's maxima or if zero comes then it's point of inflexion. ↦f(y)=x³-2 finding derivatives ↦y'= 3x²-0= 3x² ↦y'= 3x² make equal to zero ↦y'=0 ↦3x²=0 ↦x²=0 ↦x=0 Now, finding second order derivatives ↦y"= 3× 2x ↦y"= 6x Put x=0 ↦6x=6(0)=0 Finding third order derivatives ↦y"=6x ↦y"' = 6 Hence,point of inflexion is 0 and minimum point is 6.

Find Maxima minima and point of inflection of following curves . y =x^3-2

Answer»

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For point of inflexion the function has neither maxima nor minima this is called point of inflexion.

Concept

Here ,f(x) is given so,we first find its DERIVATIVE and make equal to zero and hence find VALUE of x and then find its double derivatives and put value of x here.If the function is greater than zero then it's minima or if less than zero then it's maxima or if zero comes then it's point of inflexion.

↦f(y)=x³-2

finding derivatives

↦y'= 3x²-0= 3x²

↦y'= 3x²

make equal to zero

↦y'=0

↦3x²=0

↦x²=0

↦x=0

Now, finding second order derivatives

↦y"= 3× 2x

↦y"= 6x

Put x=0

↦6x=6(0)=0

Finding third order derivatives

↦y"=6x

↦y"' = 6

Hence,point of inflexion is 0 and minimum point is 6.