Q. 56 Use the definition of torsion in... [FREE SOLUTION]

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Chapter 11: Q. 56 (page 890)

Use the definition of torsion in Exercise 52 to compute the torsion of the vector functions in Exercises 54鈥�56.
$r (t) = <3 \sin t, 5 \cos t, 4 \sin t>$

Short Answer

Expert verified

The torsion of the given vector is $蟿 (t) = 0 .$

Step by step solution

Step 1. Given Information.

The given vector function is $r (t) = <3 \sin t, 5 \cos t, 4 \sin t> .$

Step 2. Compute the torsion.

To compute the torsion of the vector function, we will use the torsion formula $蟿 (t) = \frac{(r' (t) 脳 r'' (t)) 路 r''' (t)}{{||r' (t) 脳 r'' (t)||}^{2}} .$

So,

$r (t) = <3 \sin t, 5 \cos t, 4 \sin t> r' (t) = <3 \cos t, - 5 \sin t, 4 \cos t> r'' (t) = <- 3 \sin t, - 5 \cos t, - 4 \sin t> r''' (t) = <- 3 \cos t, 5 \sin t, - 4 \cos t> Now, r' (t) 脳 r'' (t) = |\begin{matrix} i & j & k \\ 3 \cos t & - 5 \sin t & 4 \cos t \\ - 3 \sin t & - 5 \cos t & - 4 \sin t \end{matrix}| = i (20) - j (0) + k (- 15) = <20, 0, - 15> Let' s compute the dot product ((r' (t) 脳 r'' (t)) 路 r''' (t)), = <20, 0, - 15> 路 <- 3 \cos t, 5 \sin t, - 4 \cos t> = - 60 \cos t + 0 + 60 \cos t = 0 . . . . . . . . (a) Now, ||r' (t) 脳 r'' (t)|| = \sqrt{{(20)}^{2} + {(0)}^{2} + {(- 15)}^{2}} = \sqrt{400 + 225} = \sqrt{625} = 25 {||r' (t) 脳 r'' (t)||}^{2} = {(25)}^{2} {||r' (t) 脳 r'' (t)||}^{2} = 625 . . . . . . . . . . . (b)$

Step 3. Calculate.

Put the values of (a) and (b) in the torsion formula,

$蟿 (t) = \frac{(r' (t) 脳 r'' (t)) 路 r''' (t)}{{||r' (t) 脳 r'' (t)||}^{2}} 蟿 (t) = \frac{0}{625} 蟿 (t) = 0$

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91影视

Use the definition of torsion in Exercise 52 to compute the torsion of the vector functions in Exercises 54鈥�56.
$r (t) = <3 \sin t, 5 \cos t, 4 \sin t>$

Short Answer

Step by step solution

Step 1. Given Information.

Step 2. Compute the torsion.

Step 3. Calculate.

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91影视

Use the definition of torsion in Exercise 52 to compute the torsion of the vector functions in Exercises 54鈥�56.r(t)=3sint,5cost,4sint

Short Answer

Step by step solution

Step 1. Given Information.

Step 2. Compute the torsion.

Step 3. Calculate.

One App. One Place for Learning.

Most popular questions from this chapter

Recommended explanations on Math Textbooks

Mechanics Maths

Theoretical and Mathematical Physics

Discrete Mathematics

Logic and Functions

Geometry

Calculus

Study anywhere. Anytime. Across all devices.

Use the definition of torsion in Exercise 52 to compute the torsion of the vector functions in Exercises 54鈥�56.
$r (t) = <3 \sin t, 5 \cos t, 4 \sin t>$