A curve parametrically given by `x=t+t^(3)" and "y=t^(2)," where "t in R." For what vlaue(s) of t is "(dy)/(dx)=(1)/(2)`?

A curve parametrically given as x=t+t^(3)" and "y=t^(2)," where "t in R." For what vlaue(s) of t is "(dy)/(dx)=(1)/(2)

A curve in the xy-plane is parametrically given by x=t+t^(3) and y=t^(2), where t in R is the parameter.For what value (s) of t is (dy)/(dx)=(1)/(2)?(1)/(3) b.2 c.3 d.1

A curve in the xy-plane is parametrically given by x=t+t^3a n dy=t^2,w h e r et in R is the parameter. For what value(s) of t is (dy)/(dx)=1/2? 1/3 b. 2 c. 3 d. 1

A curve in the xy-plane is parametrically given by x=t+t^3a n dy=t^2,w h e r et in R is the parameter. For what value(s) of t is (dy)/(dx)=1/2? 1/3 b. 2 c. 3 d. 1

A curve in the xy-plane is parametrically given by x=t+t^3a n dy=t^2,w h e r et in R is the parameter. For what value(s) of t is (dy)/(dx)=1/2? 1/3 b. 2 c. 3 d. 1

The curve described parametrically by x=t^2+t and y=t^2-t represents :

If x=t+(1)/(t) and y=t-(1)/(t) , where t is a parameter,then a value of (dy)/(dx)

The curve described parametrically by x=t^(2)+t+1,y=t^(2)-t+1 represents

The curve described parametrically by x=t^(2)+t+1,y=t^(2)-t+1 represents :