Fint dw/dt using the chain rule W=x²y³; x=t³ ;y=t²

Answered question

2022-05-11

Fint dw/dt using the chain rule 

W=x²y³; x=t³ ;y=t²

Answer & Explanation

Nick Camelot

Nick Camelot

Skilled2023-05-07Added 164 answers

To find dwdt using the chain rule, we first need to express w in terms of t. Since w=x2y3 and x=t3 and y=t2, we have:
w=(t3)2(t2)3=t6·t6=t12
Thus, we have w=t12 and we can now differentiate with respect to t using the chain rule:
dwdt=ddt(t12)=ddt(t6·t6)
Using the product rule, we can differentiate t6·t6 with respect to t:
ddt(t6·t6)=ddt(t6)·t6+t6·ddt(t6)=6t5·t6+t6·6t5=12t11
Therefore, we have:
dwdt=ddt(t12)=12t11
Thus, dwdt=12t11 using the chain rule.

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