Feb 24, 2014 Thread starter #1 S suvadip Member Feb 21, 2013 69 Using second mean value theorem in Bonnet's form show that there exists a \(\displaystyle p \)in \(\displaystyle [a,b]\) such that \(\displaystyle \int_a^b e^{-x}cos x dx =sin ~p\) I know the theorem but how to show this using that theorem .
Using second mean value theorem in Bonnet's form show that there exists a \(\displaystyle p \)in \(\displaystyle [a,b]\) such that \(\displaystyle \int_a^b e^{-x}cos x dx =sin ~p\) I know the theorem but how to show this using that theorem .
