Q. 35 In Exercises 35-39 a vector func... [FREE SOLUTION]

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Chapter 11: Q. 35 (page 872)

In Exercises 35-39 a vector function $r (t)$ and scalar function localid="1649670265501" $t = f (蟿)$ are given. Find localid="1649670261624" $\frac{d r}{d 蟿}$ .
localid="1649670268998" $35 . r (t) = 鉄� t, t^{2}, t^{3} 鉄�, t = t^{3} + 1$

Short Answer

Expert verified

$\frac{d r}{d 蟿} = 鉄� 3 蟿^{2}, 6 蟿^{2} (蟿^{3} + 1), 9 蟿^{2} {(蟿^{3} + 1)}^{2} 鉄�$

Step by step solution

Step 1. Given data

The given vector function is $r (t) = 鉄� t, t^{2}, t^{3} 鉄�, t = t^{3} + 1$

We have to find $\frac{d r}{d 蟿}$

Step 2. Use chain rule

If $r (t)$ is a vector function and $t = f (蟿)$ , a scalar function. Then the chain rule states that $\frac{d r}{d 蟿} = \frac{d r}{d t} 鈰� \frac{d t}{d 蟿}$

$\begin{aligned} r (t) & = 鉄� t, t^{2}, t^{3} 鉄� \\ \frac{d r}{d t} & = \frac{d}{d t} 鉄� t, t^{2}, t^{3} 鉄� \\ = 鉄� \frac{d}{d t} (t), \frac{d}{d t} (t^{2}), \frac{d}{d t} (t^{3}) 鉄� \\ = 鉄� 1, 2 t, 3 t^{2} 鉄� \end{aligned}$

We have, $t = t^{3} + 1$

$\begin{aligned} \frac{d t}{d 蟿} = \frac{d}{d 蟿} (蟿^{3} + 1) \\ = 3 蟿^{2} \end{aligned}$

By the chain rule,

$\begin{aligned} \frac{d r}{d 蟿} & = \frac{d r}{d t} 鈰� \frac{d t}{d 蟿} \\ = 鉄� 1, 2 t, 3 t^{2} 鉄� 鈰� 3 蟿^{2} \\ = 鉄� 1, 2 (蟿^{3} + 1), 3 {(蟿^{3} + 1)}^{2} 鉄� 鈰� 3 蟿^{2} \\ = 鉄� 3 蟿^{2}, 6 蟿^{2} (蟿^{3} + 1), 9 蟿^{2} {(蟿^{3} + 1)}^{2} 鉄� \end{aligned}$

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91影视

In Exercises 35-39 a vector function $r (t)$ and scalar function localid="1649670265501" $t = f (蟿)$ are given. Find localid="1649670261624" $\frac{d r}{d 蟿}$ .
localid="1649670268998" $35 . r (t) = 鉄� t, t^{2}, t^{3} 鉄�, t = t^{3} + 1$

Short Answer

Step by step solution

Step 1. Given data

Step 2. Use chain rule

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91影视

In Exercises 35-39 a vector function r(t)and scalar function localid="1649670265501" t=f(蟿)are given. Find localid="1649670261624" drd蟿.localid="1649670268998" 35.r(t)=鉄�t,t2,t3鉄�,t=t3+1

Short Answer

Step by step solution

Step 1. Given data

Step 2. Use chain rule

One App. One Place for Learning.

Most popular questions from this chapter

Recommended explanations on Math Textbooks

Decision Maths

Probability and Statistics

Calculus

Pure Maths

Logic and Functions

Geometry

Study anywhere. Anytime. Across all devices.

In Exercises 35-39 a vector function $r (t)$ and scalar function localid="1649670265501" $t = f (蟿)$ are given. Find localid="1649670261624" $\frac{d r}{d 蟿}$ .
localid="1649670268998" $35 . r (t) = 鉄� t, t^{2}, t^{3} 鉄�, t = t^{3} + 1$