- Mar 8, 2003
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I have let my math skills slack while focusing on my chemistry (organic chemistry is a BIG time sink, but it makes a hell of a lot more sense than Calculus), I am stuck on these two problems (studying for an exam, finding questions in the book that I cannot do just in case he asks something similar), these two are driving me mad and I have worked on them for the past hour with little progress.
S = anti derivative symbol
S Pi * r^2 dx = formula for finding the volume of these things flipped across the axis.
1st off:
Find the volume of 3D objects below:
What I have done thus far (using S PiR^2:
Pi * S (2 - 2sinx)^2 dx = 2*Pi S (1-sinX)^2 dx = 2PI S (1 - 2SinX - (SinX)^2)
This is all fine and dandy, but I need to get the anti derivative of (sinX)^2. I cant use substitution here (it is not multiplied by Cosx) and I that the antiderivative of -(SinX)^2 is not (CosX)^2. Trig identities are useless, for all I could convert SinX into using (using the ident of (SinX)^2 + (CosX)^2 = 1) would just create another trig function that I cannot take the anti derivative of (CosX)^2. How in the world do I find the anti derivative of Sin^2? I need that integral so I can integrate it into 0 to Pi / 2 and find the volume.
Also, this one has been giving me trouble as well, as I cannot recall the specific rules:
Y = sinx*cosx between the x axis
I have to use the formula for rotating it across the axis, so it comes to this:
(here is what I have so far)
Pi S (sinx*cosx)^2 = Pi S (Sin^2)(Cos^2).
I tried substitution, u = sin, du = cos, but du would have to be squared if that were true, therefore I cannot substitute. Again I am struck with waht to do with Sin^2 when I want to get the anti derivative of it. I know I am making a simple mistake somewhere in there and once I get the anti derivative, it will be clear sailing to integration.
help......
thanks
S = anti derivative symbol
S Pi * r^2 dx = formula for finding the volume of these things flipped across the axis.
1st off:
Find the volume of 3D objects below:
What I have done thus far (using S PiR^2:
Pi * S (2 - 2sinx)^2 dx = 2*Pi S (1-sinX)^2 dx = 2PI S (1 - 2SinX - (SinX)^2)
This is all fine and dandy, but I need to get the anti derivative of (sinX)^2. I cant use substitution here (it is not multiplied by Cosx) and I that the antiderivative of -(SinX)^2 is not (CosX)^2. Trig identities are useless, for all I could convert SinX into using (using the ident of (SinX)^2 + (CosX)^2 = 1) would just create another trig function that I cannot take the anti derivative of (CosX)^2. How in the world do I find the anti derivative of Sin^2? I need that integral so I can integrate it into 0 to Pi / 2 and find the volume.
Also, this one has been giving me trouble as well, as I cannot recall the specific rules:
Y = sinx*cosx between the x axis
I have to use the formula for rotating it across the axis, so it comes to this:
(here is what I have so far)
Pi S (sinx*cosx)^2 = Pi S (Sin^2)(Cos^2).
I tried substitution, u = sin, du = cos, but du would have to be squared if that were true, therefore I cannot substitute. Again I am struck with waht to do with Sin^2 when I want to get the anti derivative of it. I know I am making a simple mistake somewhere in there and once I get the anti derivative, it will be clear sailing to integration.
help......
thanks
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