Question

Notify Me Bookmark

Assuming that the equation defines x and y implicitly as differentiable functions x=f(t), y=g(t), find the slope of the curve x=f(t), y=g(t)at the given value of t . x3+3t2 = 13,2y3

Assuming that the equation defines x and y implicitly as differentiable functions x=f(t), y=g(t), find the slope of the curve x=f(t), y=g(t)at the given value of t . x3+3t2 = 13,2y3

Image text
Assuming that the equation defines x and y implicitly as differentiable functions x = f ( t ) , y = g ( t ) , find the slope of the curve x = f ( t ) , y = g ( t ) at the given value of t .
x 3 + 3 t 2 = 13 , 2 y 3 2 t 2 = 8 , t = 2
The slope of the curve at t = 2 is . (Type an integer or simplified fraction.)

Detailed Answer

0 0

Please enter your email here. You will get email when this question is answered by our tutor.

Doubtrix Logo

Problem is not yet solved!

Click on Notify me to get email when question is answered.

Join Doubtrix with 7-days free trial

  • Icon Correct & Verified Answers
  • Icon No AI-Generated Answers
  • Icon Video Solution for Difficult Questions
  • Icon Work With Experts to Reach at Correct Answers
Notify me Login Sign Up

Similar/Related Questions

Assume that x and y are both differentiable functions of t and find the required values of dy/dt and dx/dt. y = 2(x2 − 3x) (a) Find dy/dt when x = 5, given that dx/dt = 1. dy/dt = (b) Find dx/dt when x = 8, given that dy/dt = 1. dx/dt =
Solution
0 0

Find an equation for the line tangent to the curve at the point defined by the given value of t. Also, find the value of d2y dx2 at this point. x = −cos⁡t, y = 3 + sin⁡t, t = π2 The equation for the line tangent to the curve at t = π2 is y = (Simplify your answer. Type your answer in slope-intercept form. ) d2y dx2|t = π2 = (Simplify your answer. )

Solution
0 0

The parametric equations and parameter intervals for the motion of a particle in the xy-plane are given below. Identify the particle's path by finding a Cartesian equation for it. Graph the Cartesian equation. Indicate the portion of the graph traced by the particle and the direction of motion. x = sin⁡t and y = 5 cos⁡(2t), −π2 ≤ t ≤ π2 Find an equation that relates x and y directly. y = Graph the parametric curve below. Indicate the direction of motion as t increases. Choose the correct graph below. A. B. C. Indicate the portion of the graph traced by the particle. Choose the correct answer below. A. The portion of the graph where t is greater than B. None of the graph C. The entire graph D. The portion of the graph where t is less than

Solution
0 0