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Find an Equation for the Line Tangent to the Curve $x = \csc t , y = 18 \cot t , t = \frac { \pi } { 3 }$

Question 387

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Find an equation for the line tangent to the curve at the point defined by the given value of t.
- $x = \csc t , y = 18 \cot t , t = \frac { \pi } { 3 }$

A) $y = - 36 x + 18 \sqrt { 3 }$
B) $y = 6 \sqrt { 3 } x - 36$
C) $y = 36 x + 6 \sqrt { 3 }$
D) $y = 36 x - 18 \sqrt { 3 }$

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Find an Equation for the Line Tangent to the Curve x=csc⁡t,y=18cot⁡t,t=π3x = \csc t , y = 18 \cot t , t = \frac { \pi } { 3 }x=csct,y=18cott,t=3π​

Multiple Choice

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Find an Equation for the Line Tangent to the Curve $x = \csc t , y = 18 \cot t , t = \frac { \pi } { 3 }$

Correct Answer:
Verified
Unlock this answer now
Get Access to more Verified Answers free of charge