Exploring Behaviors of Implicit Relations Quiz
Let C be the curve defined by x^2y=4. Which of the following statements is true of curve C at the point (2,1)?
It is decreasing and concave up because y′<0 and y″>0.
Let C be the curve defined by xy=−4. Which of the following statements is true of curve C at the point (−2,2) ?
It is increasing and concave up because y′>0 and y″>0.
Consider the curve in the xy-plane defined by x^2−y^2/5=1. It is known that dy/dx=5x/y and d2y/dx2=−25/y^3. Which of the following statements is true about the curve in Quadrant IV ?
The curve is concave up because d2y/dx2>0.
Consider the curve defined by x^2/16−y^2.9=1. It is known that dy/dx=9x/16y and d2y/dx2=−81/16y^3. Which of the following statements is true about the curve in Quadrant IV?
The curve is concave up because d2y/dx2>0.
Which of the following describes the x-coordinates of the points on the curve cosx=e^y in the xy-plane where the curve has a horizontal tangent line?
The values 2npi for all integers n
Which of the following describes the y-coordinates of the points on the curve e^x=siny in the xy-plane where the curve has a vertical tangent line?
The values pi/2+2npi for all integers n
At how many points on the curve x^2/3+y^2/3=9 in the xy-plane does the curve have a tangent line that is horizontal?
Two
At how many points on the curve x^2/5+y^2/5=1 in the xy-plane does the curve have a tangent line that is horizontal?
Two
If x^2y-x/y=-2, then dy/dx=
y-2xy^3/x+x^2y^2
Consider the curve in the xy-plane defined by y√y^3+1=x for y>-1. For what value of y, y>-1, does the derivative of y with respect to x not exist?
y=(-2/5)^1/3
Given the curve y2^y=x in the xy-plane, for what value of y, if any, does the derivative of y with respect to x not exist?
y=-1/ln2
If xy^2+x^2/y=5, then dy/dx=
-y(y^3+2x)/x(2y^3-x)
