1)f(x) = ex2 + sin x
2)g(x) = sin(x2) sign (x square ) under root
3)h(x) = log43x2+5
2006-12-24 22:51:22 · 4 answers · asked by astraelk 1 in Science & Mathematics ➔ Mathematics
f(x)=ex^2+sinx
f'(x)=2ex+cosx
2.g(x)=sinx^2
g'(x)=cosx^2*2x
3.h(x)=log 3x^2+5
h'(x)=1/3x^2*6x
=2/x
since parenthesis has not been used i have given the solution as per my understanding of the problem
2006-12-24 23:43:23 · answer #1 · answered by raj 7 · 0⤊ 0⤋
1) f(x) = e^(x^2) + sinx
Remember that the derivative of e^x is itself, e^x. Also, remember that the derivative of sin(x) is cos(x). Since we're dealing with x^2 instead of x for the first part, we have to use the chain rule and take the derivative of x^2 and multiply it to the derivative. I'll denote any usage of the chain rule with { } brackets.
f'(x) = e^(x^2) {2x} + cosx
Your question 2 is incomprehensible.
3) h(x) = log[base 4](3x^2 + 5)
The derivative of log[base 4](x) is 1/[xln4], so
h'(x) = 1/[4ln[3x^2 + 5] ] {6x}
2006-12-25 05:51:36 · answer #2 · answered by Puggy 7 · 0⤊ 0⤋
the procedure for all these is
1) know the the elementary derivatives like sinx' = cosx, etc
2) know the product rule
thatg is all for these sums
2006-12-25 00:30:58 · answer #3 · answered by gjmb1960 7 · 0⤊ 0⤋
f(x)=ex2+sinx
f'(x)= d(ex2)/dx+ d(sinx)/dx
= e.2x+ex2+ cosx [This has been done by applying chain rule, i.e.
d(ex2)/dx =e.d(x2)/dx + x2.de/dx = e.2x+ex2, as d(ex)/dx = ex.
Here x is raised to power of e.]
g(x) = sin(x2)sin(x2) square root
g'(x) = d(sinx2)/dx. sin(x2) square root+ sin(x2).d(sin(x2) square root)/dx
= cos(x2).2x.sin(x2) square root+ sin(x2).[x{cos(x2)}]/sin(x2) square root
= 3xcos(x2). sin(x2) square root
.h(x)=log 3x^2+5
h'(x)=1/3x^2*6x
=2/x
2006-12-24 23:51:08 · answer #4 · answered by debdd03 2 · 0⤊ 0⤋