Find the derivative with respect to t, of the function x=A_(0)+A_(1)t+A_(2)t^(2) where A_(0),A_(1)andA_(2) are constants.

Find the derivative with respect to t, of the function x=A_(0)+A_(1)t+

1.	Find the derivative with respect to t, of the function x=A_(0)+A_(1)t+A_(2)t^(2) where A_(0),A_(1)andA_(2) are constants.
Answer» <html><body><p></p>Solution :Note that here the independent variable is . and the dependent variable is .<a href="https://interviewquestions.tuteehub.com/tag/r-611811" style="font-weight:bold;" target="_blank" title="Click to know more about R">R</a>.. <br/> The <a href="https://interviewquestions.tuteehub.com/tag/required-1185621" style="font-weight:bold;" target="_blank" title="Click to know more about REQUIRED">REQUIRED</a> <a href="https://interviewquestions.tuteehub.com/tag/derivative-948877" style="font-weight:bold;" target="_blank" title="Click to know more about DERIVATIVE">DERIVATIVE</a> is `(dy)/(dx)=+A_(1)+2A_(2)t`. <br/> he second derivative is `(d^(2)<a href="https://interviewquestions.tuteehub.com/tag/x-746616" style="font-weight:bold;" target="_blank" title="Click to know more about X">X</a>)/(dt^(2))=2A_(2)`.</body></html>