a) The parametric equations for a hyperbola are x = 2sec0, y=4tan 0. Applying the parametric differentiation to solve: %3D (i) dy dx (ii) Provide answer correct to 4 significant figures and 0=1 radian. dy b) Applying logarithmic differentiation and to solve if y = x(x' –1)°.".
a) The parametric equations for a hyperbola are x = 2sec0, y=4tan 0. Applying the parametric differentiation to solve: %3D (i) dy dx (ii) Provide answer correct to 4 significant figures and 0=1 radian. dy b) Applying logarithmic differentiation and to solve if y = x(x' –1)°.".
Algebra and Trigonometry (MindTap Course List)
4th Edition
ISBN:9781305071742
Author:James Stewart, Lothar Redlin, Saleem Watson
Publisher:James Stewart, Lothar Redlin, Saleem Watson
Chapter8: Polar Coordinates And Parametric Equations
Section8.CT: Chapter Test
Problem 8CT
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Transcribed Image Text:a) The parametric equations for a hyperbola are x = 2 sec0, y= 4 tan 0.
Applying the parametric differentiation to solve:
(i)
dy
dx
y
(ii)
dx
Provide answer correct to 4 significant figures and 0=1radian.
b) Applying logarithmic differentiation and to solve
dy if y = x²(x' -1)° .
dx
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