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161) if q is an integer that can be expressed as the sum of two integer squares, show that both 2q and 5q can also be expressed as the sum of two integer squares

User Rey Gonzales
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Given that q is an integer that can be expressed as the sum of two integer squares, Let's show that 2q and 5q can also be expressed as the sum of two integer squares.

Let a and b represent the integers.

We have:

a² + b² = q

To show that both 2q can also be expressed as the sum of two integer squares, we have:


\begin{gathered} (a+b)^2+(a-b)^2 \\ \\ =(a+b)(a+b)+(a-b)(a-b) \\ \\ =a(a+b)+b(a+b)+a(a-b)-b(a-b)^{} \\ \\ =a^2+ab+ab+b^2+a^2-ab-ab+b^2 \\ \\ =a^2+a^2+ab+ab-ab-ab+b^2+b^2 \\ \\ =2a^2+2b^2 \\ \\ =2(a^2+b^2) \end{gathered}

Since a² + b² = q, we have:

2(a² + b²) = 2q

From the above we have shown that 2q can also be expressed as the sum of two integer squares.

• To show that both 5q can also be expressed as the sum of two integer squares, let's apply the expression below:


\begin{gathered} (a+2b)^2+(2a-b)^2 \\ \\ =a^2+4ab+4b^2+4a^2-4ab+b^2 \\ \\ =a^2+4a^2+4ab-4ab+4b^2+b^2 \\ \\ =5a^2+5b^2 \\ \\ =5(a^2+b^2) \\ \\ =5q \end{gathered}

Using the above expression, we have shown that 5q can also be expressed as the sum of two integer squares.

User Zgluis
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