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More Harmonic Integers (Posted on 2007-03-12)

Determine three positive integers x, y and z in harmonic sequence such that x<y<z, xy=z, and (x, y, z-72) are in arithmetic sequence.

Submitted by K Sengupta

Rating: 3.5000 (2 votes)

Solution: (Hide)

Since x, y and z are in harmonic sequence with x < y< z, it follows that y = 2xz/(x+z).

Since, xy=z and z must be positive, we obtain: 2*x^2 = x+ z,so that:
z = 2*x^2 - x and y = 2x-1.

Now, x+ z-72 = 2y
Or, 2*x^2 - 4x - 70 = 0.

The only positive root of the above equation is given by x = 7, so that y = 2*7-1 = 13 and z = 7*13 = 91

Consequently, (x,y,z) =(7,13,91) is the only possible solution to the given problem.

Comments: ( You must be logged in to post comments.)

Subject	Author	Date
Solution (and a half)	Brian Smith	2007-03-14 20:55:50
Solution	Dej Mar	2007-03-12 11:58:56
spoiler	Ady TZIDON	2007-03-12 08:26:48

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