Arithmetic Series (1 Viewer)

SunnyScience · Feb 9, 2012

Fitzpatrick ex 11(b) Q40

The lengths of the sides of a right angled triangle form the terms of an arithmetic sequence. Of the hypotenuse is 15 cm in length, what is the length of the other two sides?

I used Pythagoras theorem and the quadratic formula, but the answer I got was 15 :/ (went in a circle)

Help please? c:

SunnyScience · Feb 9, 2012

Bump, please?

nightweaver066 · Feb 9, 2012

$Let the other two sides be $ a, \; a + d$

$Note that the hypotenuse is $ a + 2d $ as it is the longest side$

$\therefore a + 2d = 15$

$a^2 + (a + d)^2 = 15^2$

$Subbing a = 15 - 2d$

$(15 - 2d)^2 + (15 - d)^2 = 225$

$225 - 60d + 4d^2 + 225 - 30d + d^2 = 225$

$5d^2 -90d + 225 = 0$

$d^2 - 18d + 45 = 0$

$(d - 15)(d - 3)$

$\therefore $ d = 15 or 3$$

$But, the hypotenuse is already 15, so d = 3$

$$Sub d = 3 in to the quadratic, $ a^2 + (a + 3)^2 = 225$

$2a^2 + 6x - 216 = 0$

$a^2 + 3x - 108$

$(a + 12)(a - 9)$

$\therefore a = 9, a > 0$

$\therefore $ The other side lengths are 9cm and 12cm$$

Shadowdude · Feb 9, 2012

The side lengths are: a, a+d, a+2d. This is because they're in a ~~geometric~~ arithmetic sequence.

We are given a+2d = 15, because the hypotenuse is the longest side.

We use Pythagoras:

$a^{2} + (a+d)^{2} = 15^{2}$

$225 = a^{2} + a^{2} + 2ad + d^{2}$

$225 = 2a^{2} + 2ad + d^{2}$

Now we know that a+2d = 15.

We note that:

$225 = (a+2d)^{2} = a^{2} + 4ad + 4d^{2}$

And so, we use that fact to get:

$225 = (a^{2} + 4ad + 4d^{2}) + a^{2} - 2ad - 3d^{2}$

$225 = 225 + a^{2} - 2ad - 3d^{2}$

$0 = a^{2} - 2ad - 3d^{2}$

Now we note that a = 15 - 2d. So:

$0 = (15-2d)^{2} -2d(15-2d) - 3d^{2}$

$0 = 225 - 60d + 4d^{2} - 30d + 4d^{2} - 3d^{2}$

$0 = 225 - 90d + 5d^{2}$

$0 = 45 - 18d + d^{2}$

$0 = (d-15)(d-3)$

So d = 15, or d = 3.

Try d=15 into what we know: a = 15 - 2d.

$a = 15 - 2(15) = -15$

We cannot have a negative side value, so d cannot be 15. Thus, d = 3.

Try d = 3.

$a = 15 - 2(3) = 15 - 6 = 9$

Our side lengths are a, a+d, a+2d. Or, 9, 12 and 15.

Check:

$9^{2} + 12^{2} = 225 = 15^{2}$

So we're right. The answer is 9 and 12.

Drongoski · Feb 9, 2012

The Pythagorean Triples: {3,4,5}, {5,12,13},{8,15,17} . . .

Obviously this one comes from the {3,4,5} family. For this question: the triples are 3 x {3,4,5} = {9,12,15}

I know the question expects you to work it out the usual way.

SunnyScience · Feb 9, 2012

Thanks guys for your help

did some incorrect substitution ^^

Shadow: *arithmetic sequence

Drong: thanks, I knew that, but thank you for sharing as someone else doing this question might have not. ty

Shadowdude · Feb 9, 2012

Arithmetic sequence, yeah, you're right.

Point is, we got the right answer... eventually.

SunnyScience · Feb 9, 2012

Thanks for your time - I really do appreciate it

Carrotsticks · Feb 9, 2012

Drongoski said:
The Pythagorean Triples: {3,4,5}, {5,12,13},{8,15,17} . . .

Obviously this one comes from the {3,4,5} family. For this question: the triples are 3 x {3,4,5} = {9,12,15}

I know the question expects you to work it out the usual way.

This is assuming the solutions are integers.

Is it possible to have non-integer solutions satisfying an AP and Pythagoras' Theorem?

Rezen · Feb 14, 2012

Yes,
In-fact all scaling of the triple {3,4,5} by a real number form an AP. Since r x {3,4,5} = {3r,4r,5r}={3r, 3r + r, 3r + 2r}.
i.e, when r = 1.5, then the triple {4.5,6,7.5} satisfy both the Pythagorean theorem and form an AP.

Arithmetic Series (1 Viewer)

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