[tex] \text{Let the coordinate of the point be P(x,y)}.\\
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\text{this point is 3/8 of the way from }A(-8,-9)\text{ to }B(24,-1).\\
\text{so this point is divide the line joining AB in a ratio }3:5\\
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\text{by the division ratio, we know that if a point P divides }A(x_1,y_1)\text{ and }B(x_2,y_2)\\
\text{in a ratio m:n, then we have} [/tex]
[tex] P=\left ( \frac{mx_2+nx_1}{m+n}, \ \frac{my_2+ny_1}{m+n} \right )\\
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\text{so using this, the coordinates of the required point are:}\\
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P=\left ( \frac{3(24)+5(-8)}{3+5}, \ \frac{3(-1)+5(-9)}{3+5} \right )\\
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\Rightarrow P=\left ( \frac{32}{8}, \ \frac{-48}{8} \right )\\
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\Rightarrow P=(4, -6) [/tex]
Hence the coordinate of the point that is 3/8 of the way from A to B is: (4, -6)
