Q: What is the area of a 1 by 2 rectangle?

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240 times. We need to find the area of each and divide them into each other. Rectangle 1: 4x5=20 Rectangle 2: 40x120=4800 The area of cube 2 divided my the area of cube 1 is the answer. 4800/20=240.

No. Different rectangles, all with the same area, may have a different perimeter. Example:* A rectangle of 4 x 1 has an area of 4 square units, and a perimeter of 2(4+1) = 10. * A rectangle of 2 x 2 has an area of 4 square units, and a perimeter of 2(2+2) = 8. * A rectangle of 8 x 1/2 has an area of 4 square units, and a perimeter of 2(8 + 1/2) = 17. In fact, for any given area, you can make the perimeter arbitrarily large. On the other hand, you get the lowest perimeter if your rectangle is a square.

It is possible for to shapes to have the same area but different perimeters because, for example, one shape could be a 2 by 4 rectangle and another shape be a 1 by 8 rectangle. Both shapes have an area of 8 (2*4=8 and 1*8=8) but the 2 by 4 has a perimeter of 12 (2+2+4+4=12) but the 1 by 8 rectangle has an area of 18 (1+1+8+8=18).

There is no simple relationship between area and perimeter. For the same area, you can have different perimeters, depending on whether the enclosed area is a square, a 2:1 rectangle, a 3:1 rectangle, etc., a circle, a 2:1 ellipse, a regular pentagon, etc.

If a rectangle had a length of 2 and a perimeter of 2, its width would need to be negative 1. However, width, by definition is non-negative and so a width of -1 is impossible. As a result, such a rectangle cannot exist. And since it cannot exist, it cannot have an area.

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240 times. We need to find the area of each and divide them into each other. Rectangle 1: 4x5=20 Rectangle 2: 40x120=4800 The area of cube 2 divided my the area of cube 1 is the answer. 4800/20=240.

No. Different rectangles, all with the same area, may have a different perimeter. Example:* A rectangle of 4 x 1 has an area of 4 square units, and a perimeter of 2(4+1) = 10. * A rectangle of 2 x 2 has an area of 4 square units, and a perimeter of 2(2+2) = 8. * A rectangle of 8 x 1/2 has an area of 4 square units, and a perimeter of 2(8 + 1/2) = 17. In fact, for any given area, you can make the perimeter arbitrarily large. On the other hand, you get the lowest perimeter if your rectangle is a square.

Let's take a look at this problem.Rectangle Perimeter = 2(l + w)Rectangle Perimeter =? 2(2l + 2w)Rectangle Perimeter =? (2)(2)(l + w)2(Rectangle Perimeter) = 2[2(l + w)]Thus, we can say that the perimeter of a rectangle is doubled when its dimensions are doubled.Rectangle Area = lwRectangle Area =? (2l)(2w)Rectangle Area =? 4lw4(Rectangle Area) = 4lwThus, we can say that the area of a rectangle is quadruplicated when its dimensions are doubled.

1 square meter is the area of a square, that has 1 meter on every side. Also, any other figure that has the same surface area, for example, a rectangle of 1/2 meter times 2 meters.1 square meter is the area of a square, that has 1 meter on every side. Also, any other figure that has the same surface area, for example, a rectangle of 1/2 meter times 2 meters.1 square meter is the area of a square, that has 1 meter on every side. Also, any other figure that has the same surface area, for example, a rectangle of 1/2 meter times 2 meters.1 square meter is the area of a square, that has 1 meter on every side. Also, any other figure that has the same surface area, for example, a rectangle of 1/2 meter times 2 meters.

It is possible for to shapes to have the same area but different perimeters because, for example, one shape could be a 2 by 4 rectangle and another shape be a 1 by 8 rectangle. Both shapes have an area of 8 (2*4=8 and 1*8=8) but the 2 by 4 has a perimeter of 12 (2+2+4+4=12) but the 1 by 8 rectangle has an area of 18 (1+1+8+8=18).

There is no simple relationship between area and perimeter. For the same area, you can have different perimeters, depending on whether the enclosed area is a square, a 2:1 rectangle, a 3:1 rectangle, etc., a circle, a 2:1 ellipse, a regular pentagon, etc.

No. A rectangle of 1 x 3 has the same perimeter as a rectangle of 2 x 2, but the areas are different.

If a rectangle had a length of 2 and a perimeter of 2, its width would need to be negative 1. However, width, by definition is non-negative and so a width of -1 is impossible. As a result, such a rectangle cannot exist. And since it cannot exist, it cannot have an area.