Al-Khwarizmi, the father of modern mathematics try to solve the following: One square and ten roots of the same are equal to thirty-nine dirhems - What must be the square that when increased by ten of its own roots, amounts to thirty-nine?

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Al-Khwarizmi, the father of modern mathematics try to solve the following: One square and ten roots of the same are equal to thirty-nine dirhems - What must be the square that when increased by ten of its own roots, amounts to thirty-nine?

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Answer 1 · 2017-03-04T09:27:33

Answer is $3$

Explanation:

As the problem states that

"what must be the square that when increased by ten of its own roots, amounts to thirty-nine"

it means if the number is $x$ , then

$x^2+10x=39$ - and adding $25$ on both sides we get

$x^2+10x+25=39+25$

or $x^2+10x+25=64$

or $(x+5)^2-64=0$

i.e. $(x+5+8)(x+5-8)=0$

i.e. $(x+13)(x-3)=0$

Hence, either $x=3$ or $x=-13$

It may, however, be noted that in the times of Al-Khwarizmi, negative numbers were not considered and further, the problem emanates from the geometric problem represented by following figure (not drawn to scale - it is in fact a square),

enter image source here

where Al-Khwarizmi sought solution to the side of inner square, where shaded area that forms the box is $39$ units. The inner square is $x^2$ and four rectangles are $4×5/2×x=10x$ .

As it was essentially a geometric figure, $-13$ was ruled out.

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Al-Khwarizmi, the father of modern mathematics try to solve the following: One square and ten roots of the same are equal to thirty-nine dirhems - What must be the square that when increased by ten of its own roots, amounts to thirty-nine?

1 Answer

Explanation:

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