A Long Rectangular Sheet Of Metal 12 In Wide
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Find its perimeter length of rectangle 12 1 2 cm breadth of rectangle 10 2 3 cm perimeter 2 length breadth 2 12 1 2 10 2 3 2 12 1 2 10 2 3 2 12 10 1 2 2 3 2 22 1 3 2 2 2 3 2 22 3 4 6 2 22 7 6 2 22 2 7 6 44 7 3 44 3 7 3.
A long rectangular sheet of metal 12 in wide. A long rectangular sheet of metal 12 inches wide is to be made into a rain gutter by turning up two sides at 120 degrees to the sheet. Ex 2 1 4 a rectangular sheet of paper is 12 1 2 cm long and 10 2 3 cm wide. This is a calculus 1 problem. How many inches should be turned up to give the gutter its greatest capacity.
A long rectangular sheet of metal 12 inches wide is to be made into a rain gutter by turning up sides at right angles to the sheet. How many inches should be turned up. A rectangular piece of metal is 15in longer than it is wide. Asked by meg on november 15 2010.
Squares with sides 3 in long are cut from four corners and the flaps are folded up to form an open box. A long rectangular sheet of metal 10 in. Find its area and perimeter. I would appreciate any help on solving this problem.
The semi circle sits on top of the rectangle on a side that is 4. A long rectangular sheet of metal 12 inches wide is to be made into a rain gutter by turning up two sides so that they are perpendicular to the sheet. Sides so that they are perpendicular to the sheet. How many inches should be trimmed up to give the gutter its greatest capacity.
A long rectangular sheet of metal 12 inches wide is to be made into a rain gutter by turning up the two. The rectangle is 4 inches long and 3 inches wide. How many inches should be turned up to give the gutter its greatest capacity. A semi circle sits on top of a rectangle to form the figure below.
Wide is to be made into a gutter by turning up sides of equal length perpendicular to the sheet. A long rectangular sheet of metal 12 inches wide is to be made into a rain gutter by turning up two sides so that they are perpendicular to the sheet. If the volume is 1218in 3 what we re the original deminsions.
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