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How do you differentiate the following parametric equation: # x(t)=te^t+5t, y(t)= t^2-3e^(t) #?

1 Answer

Sep 23, 2016

#dy/dx=((t+1)e^t+5)/(2t-3e^t).#

Explanation:

By Defn., #dy/dx=(dy/dt)/(dx/dt)#

#y=y(t)=t^2-3e^t rArr dy/dt=d/dt(t^2-3e^t)=d/dt(t^2)-d/dt(3e^t)#

#=2t-3e^t#

#x=x(t)=te^t+5t rArr dx/dt=d/dt(te^t+5t)=d/dt(te^t)+d/dt(5t)#

#=td/dt(e^t)+e^td/dt(t)+5=te^t+e^t+5=(t+1)e^t+5#

#:. dy/dx=((t+1)e^t+5)/(2t-3e^t).#

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