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The value of y that minimizes the sum of the two distances from (3,5) to (1,y) and from (1,y) to (4,9) can be written as a/b where a and b are coprime positive integers. Find a+b.
Determine or find out the domain of the subsequent function. r → (t) = {cos t, ln (4- t) , √(t+1)} Solution The first component is described for all t's. The second com
Consider the trigonometric function f(t) = -3 + 4 cos(Π/ 3 (t - 3/2 )). (a) What is the amplitude of f (t)? (b) What is the period of f(t)? (c) What are the maximum and mi
A ladder sets against a wall at an angle α to the horizontal. If the foot is pulled away from the wall through a distance of 'a', so that is slides a distance 'b' down the wall ma
Find out the length of y = ln(sec x ) between 0 x π/4. Solution In this example we'll need to use the first ds as the function is in the form y = f (x). So, let us g
2*9
200 + 406578
Ask if tanA+sinA=m and m^2-n^2=4 rute mn show that tanA-sinA=n
1) Find the are length of r(t) = ( 1/2t^2, 1/3t^3, 1/3t^3) where t is between 1 and 3 (greater than or equal less than or equal) 2) Sketch the level curves of f(x,y) = x^2-2y^2
Can anyone help with my exam. I have 8 questions to do which is due on 02-14-13
Calucations of gradients find f Graph some level curve f=const. f=9x^2 = 4y^2
the minimum distance of the points from (1,y) is the distance from the intersection of their perpendicular bisectors to the line x=1hence slope of perpendicular bisector=> -4=2y-14 / 2x -7 => 8x + 2y = 42.putting x=1,y=17,hence a+b= 17 +1 =18 (ANS).
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