For the following function represented parametrically
My Self Assessment
a)
Find the second derivative of y with respect to x for the following function defined parametrically x = a y = b
Find the second derivative of y with respect to x for the following function defined parametrically x = + 3t + 1 y = − 3t + 1
Find the second derivative of y with respect to x for the following function defined parametrically x = a (cos t + t sin t) y = a (sin t − t cos t)
Find where x = sec t and y = tan t
Find the derivative of the following function x3 + x2y + y2 = 0
Find the derivative of the following function ln x + = c
Find the derivative of the following function x2 + y2 – 4x – 10y + 4 = 0
Find the derivative of the following function
Find if tan−1y – y + x = 0
Find if = y – x
Find if x + y = ex – y
Find the value of y” at x = 1 if x3 – 2x2y2 + 5x + y – 5 = 0 and = 1
a) 5
b) – 8
c)
d)
Find for the following implicit function
Find for the following implicit function = ln
Find for the following implicit function sin y − cos x = 0
Find for the following implicit function + xy = e, find at the point (0, 1)
Find of the following function x2 + 5xy + y2 – 2x + y – 6 = 0 find at the point (1, 1)
For the following function represented parametrically find x = ln (1 + t2)
y = t −
For the following function represented parametrically find