Let x be the number of inches by which each dimension must be increased. Then the new width of the picture frame is 6 + x inches, and the new height is 10 + x inches. The new area of the picture frame is 7 times the original area, which is:
7(6 in × 10 in) = 420 in²
The new area can also be expressed as the product of the new length and width:
(6 in + x)(10 in + x)
Expanding this expression, we get:
60 in² + 16x + x² = 420 in²
Subtracting 420 in² from both sides and simplifying, we get:
x² + 16x - 360 = 0
We can solve this quadratic equation using the quadratic formula:
x = (-16 ± sqrt(16² + 4(1)(360))) / 2(1)
x = (-16 ± sqrt(256 + 1440)) / 2
x = (-16 ± sqrt(1696)) / 2
x = (-16 ± 41.19) / 2
x = -28.59 / 2 or x = 25.59 / 2
Since we are looking for a positive increase in dimension, we discard the negative solution and obtain:
x = 25.59 / 2 ≈ 12.795
Therefore, each dimension must be increased by approximately 12.795 inches to make the area 7 times as large.