The required "option A) [tex]5(3x + x^2)^{4} (3+2x)[/tex]" is correct.
Step-by-step explanation:
We have,
[tex]y = (3x + x^2)^5[/tex] ..... (1)
To find, [tex]\dfrac{dy}{dx}[/tex] = ?
Differentiating equation (1) w.r.t. 'x', we get
[tex]\dfrac{dy}{dx}= \dfrac{d[(3x + x^2)^5]}{dx}[/tex]
⇒ [tex]\dfrac{dy}{dx}=5(3x + x^2)^{5-1} \dfrac{d(3x + x^2)}{dx}[/tex]
[ ∵ [tex]y=x^{n}[/tex] ⇒ [tex]\dfrac{dy}{dx}=nx^{n-1}[/tex]]
⇒ [tex]\dfrac{dy}{dx}=5(3x + x^2)^{4} (3(1) + 2x^{2-1})[/tex]
⇒ [tex]\dfrac{dy}{dx}=5(3x + x^2)^{4} (3+2x)[/tex]
Thus, the required "option A) [tex]5(3x + x^2)^{4} (3+2x)[/tex]" is correct.
