
title=2. Integral
sol=3
prompt=$m_F(x)

shift=-1
c0=!randint -7,7

parisrc=ser3=intformal(ser1,x)+($c0);

present=!nosubst Let $m_f be a function which is continuous\
 and differentiable to order $[$order+1] near $x0, with Taylor expansion\
 <p><center>\
 $m_f(x) = $ser1&nbsp;,</center> <p>\
 and let $m_F(x) be the antiderivative of $m_f with $m_F($t0)=$c0.\
 Please compute the Taylor expansion near $t0 of\
 $prompt&nbsp;.

