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Given that P(3,2,-4), Q(5,4,-6) and R(9,...

Given that `P(3,2,-4), Q(5,4,-6) and R(9,8,-10)` are collinear. Find the ratio in which Q divides PR.

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The correct Answer is:
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Let point Q(5,4,-6) divides the line segment joining the points P(3,2,-4) and R(9,8,-10) in the ratio `k : 1`.
`therefore 5=(k(9)+1(3))/(k+1)`
`5k+5=9k+3 implies k=(1)/(2)`
`4=(k(8)+1(2))/(k+1)`
`implies 4k+4=8k+2 implies k=(1)/(2)`
`-6=(k(-10)+1(-4))/(k+1)`
`-6k 6= -10k-4 implies k-(1)/(2)`
`therefore` Required ratio = 1 : 2
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