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Write a Chain Rule Formula for the Following Derivative A)

Question 302

Multiple Choice

Write a chain rule formula for the following derivative.
- $\frac { \partial \mathrm { w } } { \partial \mathrm { t } } \text { for } \mathrm { w } = \mathrm { f } ( \mathrm { p } , \mathrm { q } , \mathrm { r } ) ; \mathrm { p } = \mathrm { g } ( \mathrm { t } ) , \mathrm { q } = \mathrm { h } ( \mathrm { t } ) , \mathrm { r } = \mathrm { k } ( \mathrm { t } )$

A) $\frac { \partial \mathrm { w } } { \partial \mathrm { t } } = \frac { \mathrm { dp } } { \mathrm { dt } } + \frac { \mathrm { dq } } { \mathrm { dt } } + \frac { \mathrm { dr } } { \mathrm { dt } }$
B) $\frac { \partial \mathrm { w } } { \partial \mathrm { t } } = \frac { \partial \mathrm { w } } { \partial \mathrm { p } } \frac { \mathrm { dt } } { \mathrm { dp } } + \frac { \partial \mathrm { w } } { \partial \mathrm { q } } \frac { \mathrm { dt } } { \mathrm { dq } } + \frac { \partial \mathrm { w } } { \partial \mathrm { r } } \frac { \mathrm { dt } } { \mathrm { dr } }$
C) $\frac { \partial \mathrm { w } } { \partial \mathrm { t } } = \frac { \partial \mathrm { w } } { \partial \mathrm { p } } + \frac { \partial \mathrm { w } } { \partial \mathrm { q } } + \frac { \partial \mathrm { w } } { \partial \mathrm { r } }$
D) $\frac { \partial \mathrm { w } } { \partial \mathrm { t } } = \frac { \partial \mathrm { w } } { \partial \mathrm { p } } \frac { \mathrm { dp } } { \mathrm { dt } } + \frac { \partial \mathrm { w } } { \partial \mathrm { q } } \frac { \mathrm { dq } } { \mathrm { dt } } + \frac { \partial \mathrm { w } } { \partial \mathrm { r } } \frac { \mathrm { dr } } { \mathrm { dt } }$

Write a Chain Rule Formula for the Following Derivative A)

Multiple Choice

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