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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.
Importance of positioning
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6 male students and 3 female students sit around a round table. The probability that no 2 female students sit beside each other can be expressed as a/b, where a and b are coprime p
how to solve
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compare 643,251 633,512 and 633.893 the answer is 633.512 what is the question
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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