How can I find the lengths of the sides of two squares if the sum of their areas is 468 m² and the difference of their perimeters is 24 m?

Finding the Side Lengths of Two Squares

To solve the problem, let’s denote the side lengths of the two squares as s₁ and s₂.

We know from the problem:

• The sum of their areas: s₁² + s₂² = 468
• The difference of their perimeters: 4s₁ – 4s₂ = 24

From the perimeter equation, we can simplify:

s₁ – s₂ = 6

Now we can express s₁ in terms of s₂:

s₁ = s₂ + 6

Next, we’ll substitute this expression into the area equation:

(s₂ + 6)² + s₂² = 468

Expanding the first term:

(s₂² + 12s₂ + 36) + s₂² = 468

Simplifying gives us:

2s₂² + 12s₂ + 36 = 468

Next, subtract 468 from both sides:

2s₂² + 12s₂ – 432 = 0

Now, we can simplify by dividing everything by 2:

s₂² + 6s₂ – 216 = 0

We can solve this quadratic equation using the quadratic formula, where a = 1, b = 6, and c = -216:

s₂ = (-b ± √(b² – 4ac)) / 2a

Substituting the values:

s₂ = (-6 ± √(6² – 4 * 1 * -216)) / (2 * 1)

s₂ = (-6 ± √(36 + 864)) / 2

s₂ = (-6 ± √900) / 2

s₂ = (-6 ± 30) / 2

This yields two potential solutions:

• s₂ = 12 m (choosing the positive root for a side length)
• s₂ = -18 m (not a valid solution as lengths cannot be negative)

So we find s₂ = 12 m.

Next, we can find s₁:

s₁ = s₂ + 6 = 12 + 6 = 18 m

Final Result:

• The side length of the first square is: 18 m
• The side length of the second square is: 12 m

In conclusion, the side lengths of the two squares are 18 m and 12 m, respectively.