The September, 2007 Problem of the Month
Find a pair of unequal numbers,
x and y so that each one is the square of the other.
Hint:
My idea of numbers is very inclusive.
Solution:
If x = y2 and y = x2, then y = (y2)2
= y4. So y4 – y = 0, or y(y3
– 1) = 0, so finally we factor as y(y –
1)( y2 + y + 1) = 0. The
solutions are y = 0, y = 1, and
y = [-1 +/– sqrt(-3)]/2. If we let y = [-1 + i*sqrt(3)]/2, then x = [-1 – i*sqrt(3)]/2, and we can readily verify y = x2 and
x = y2.
( [-1 + i*sqrt(3)]/2)2 = [1 –
2*i*sqrt(3) + i2*3]/4
= [1 – 2*i*sqrt(3) +(-1)*3]/4
= [-2 – 2*i*sqrt(3)]/4 = [-1 – i*sqrt(3)]/2
Similarly,
( [-1 – i*sqrt(3)]/2)2 = [1 +
2*i*sqrt(3) + i2*3]/4
= [1 + 2*i*sqrt(3) +(-1)*3]/4
= [-2 + 2*i*sqrt(3)]/4 = [-1 + i*sqrt(3)]/2
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