Author Topic: c4 fast differentiation doubt (Read 729 times)

zabady · « **on:** April 28, 2010, 11:51:59 pm »

attached down

T.Q · « **Reply #1 on:** April 29, 2010, 01:41:05 am »

$\frac{dv}{dt}= -k'\sqrt{v}$

V=Ah

so, $\frac{dv}{dh}=A$

$\frac{dh}{dt}=\frac{dh}{dv} X \frac{dv}{dt}$

$\frac{dh}{dt}=( \frac{1}{A}) X( -k'\sqrt{v})$

$\frac{dh}{dt}=( \frac{-k'\sqrt{A}\sqrt{h}}{A})$

$\frac{dh}{dt}=( \frac{-k'\sqrt{h}}{\sqrt{A}})$

so , $K=( \frac{k'}{\sqrt{A}})$

$\frac{dh}{dt}= -K\sqrt{h}$

zabady · « **Reply #2 on:** April 29, 2010, 02:06:35 am »

but how u got k=(-k/squarroot A)

T.Q · « **Reply #3 on:** April 29, 2010, 10:11:31 am »

Quote from: zabady on April 29, 2010, 02:06:35 am

but how u got k=(-k'/squarroot A)

because K is a positive constant

and i used k prime (k') in solving ,

K is different from k' ,

u can put (t) instead of (k') to make it more simpler

News:

Author Topic: c4 fast differentiation doubt (Read 729 times)

zabady

c4 fast differentiation doubt

T.Q

Re: c4 fast differentiation doubt

zabady

Re: c4 fast differentiation doubt

T.Q

Re: c4 fast differentiation doubt