we want to build a box with square base of side x and height and in such a way that the volume is 128 cubic inches. If we know t

Question

2 years ago

14

hat the sum of the length of the length of its edges is equal to 64 inches, what should be the box dimensions?

1 answer:

sergij07 [2.7K] · Answer 1 · 2022-02-13T16:29:02+03:00

Answer:

4 in × 4 in × 8 in or

6.47 in × 6.47 in × 3.06 in

Step-by-step explanation:

Data:

(1) V = 128 in³

(2) l = w = x

(3) 4(l + w + h) = 64 in (There are 12 edges)

Calculation:

The formula for the volume of the box is

(4) V = lwh

(5) 128 = x²h Substituted (1) and (2) into (4)

(6) h = 128/x² Divided each side by x²

l + w +h = 16 Divided (1) by 4

x + x + h = 16 Substituted (2) into 6

(7) 2x + h = 16 Combined like terms

2x + 128/x² = 16 Substituted (6) into (7)

2x³ + 128 = 16x² Multiplied each side by x²

2x³ - 16x²+ 128 = 0 Subtracted 16x² from each side

x³ - 8x² + 64 = 0 Divided each side by 2

According to the Rational Zeros theorem, a rational root must be a positive or negative factor of 64.

The possible factors are ±1, ±2, ±4, ±8, ±16, ±32, ± 64.

After a little trial-and-error with synthetic division (start in the middle and work down) we find that x = 4 is a zero.

4|1 -8 0 64

1 -4 -16 0

So, the cubic equation factors into (x - 4)(x² - 4x + 16) = 0

We can use the quadratic formula to find that the roots of the quadratic are

x = 2 - 2√5 and x = 2+ 2√5

We reject the negative value and find that there are two solutions to the problem.

x = 4 in and x = 2 + 2√5 ≈ 6.472 in

Case 1. x = 4 in

h = 128/x² = 128/4² = 128/16 = 8 in

The dimensions of the box are 4 in × 4 in × 8 in

Also, 4(l + w + h) = 4( 4 + 4 + 8) = 4 × 16 = 64 in

Case 2. x = 6.472 in

h = 128/x² = 128/6.472² = 128/41.89 = 3.056 in

The dimensions of the box are 6.47 in × 6.47 in × 3.06 in

Also, 4(l + w + h) = 4( 6.47 + 6.47 + 3.06) = 4 × 16.00 = 64 in

The two solutions are

(a) 4 in × 4 in × 8 in

(b) 6.47 in × 6.47 in × 3.06 in