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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.
Illustrates that the following numbers aren't solutions to the given equation or inequality. y = -2 in 3( y + 1) = 4 y - 5 Solution In this case in essence we do the sam
y'-5y=0
Project part A, part B, part C
Consider the following linear programming problem: Min (12x 1 +18x 2 ) X 1 + 2x 2 ≤ 40 X 1 ≤ 50 X 1 + X 2 = 40 X
the value of square root of 200multiplied by square root of 5+
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find the equation to the sphere through the circle xsqaure+ysquare+zsquare+=9 , 2x+3y+4z=5
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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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