mid1-2010

# mid1-2010 - Question 1. [4 points] Calculate a ) Z 2- 2 1 y...

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Unformatted text preview: Question 1. [4 points] Calculate a ) Z 2- 2 1 y 2- 9 dy b ) Z / 2- / 2 sin( x ) 1 + cos 2 ( x ) dx Solution. a ) We have 1 y 2- 9 = 1 ( y- 3)( y + 3) = a y- 3 + b y + 3 = ( a + b ) y + 3( a- b ) ( y- 3)( y + 3) , with a + b = 0 and 3( a- b ) = 1, which implies a = 1 / 6 and b =- 1 / 6. Z 2- 2 1 y 2- 9 dy = 1 6 Z 2- 2 1 y- 3 dy- Z 2- 2 1 y + 3 dy = 1 6 ( [ln | y- 3 | ] 2- 2- [ln | y + 3 | ] 2- 2 ) =- 1 3 ln(5) b ) Substituting y = cos( x ), we have dy =- sin( x ) dx . Z / 2- / 2 sin( x ) 1 + cos 2 ( x ) dx = Z cos( / 2) cos(- / 2)- 1 1 + y 2 dy = Z- 1 1 + y 2 dy = [- arctan( y )] = 0 Question 2. [3 points] Solve the differential equation dy dt = 6 t sin t y with initial condition y (0) = 5. Solution. First we separate the differential equation, putting the y s on the left and the t s on the right, and add an integral sign to obtain Z y dy = Z 6 t sin tdt. The left-hand integral is simple : y 2 / 2. (We omit the + C with this integral.) The right-hand integral requires integration by parts. Set u = t , dv = sin tdt , so that du = dt , v =- cos t . Then we obtain Z 6 t sin tdt = 6 Z t sin tdt 1 = 6- t cos t- Z (- cos t ) dt = 6 [- t cos t + sin t ] + C. So the general solution to the differential equation is y 2 / 2 = 6 [- t cos t + sin t ] + C ; solving for y gives y = p 12(- t cos t + sin t ) + C. (*) (The constant C here is not the same as in the previous line. To be more accurate, you can write +2 C or + D instead of + C in equation (*), with D a different arbitrary constant.) This means that the various particular solutions are obtained by selecting one of and a particular constant C ....
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## mid1-2010 - Question 1. [4 points] Calculate a ) Z 2- 2 1 y...

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