Math, asked by milivansh7521, 1 year ago

A rectangular field is of dimensions 20 m × 15 m. two paths run parallel to the sides of the rectangle through the centre of the field. the width of the longer path is 2 m and that of the shorter path is 1 m. find that: (a) area of the paths (b) area of the remaining portion of the field. (c) cost of constructing the roads at the rate of $10 per m2.

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Answered by sujitgupta1416
0

A rectangular field is of dimensions 20 m × 15 m. two paths run parallel to the sides of the rectangle through the centre of the field. the width of the longer path is 2 m and that of the shorter path is 1 m. find that: (a) area of the paths (b) area of the remaining portion of the field. (c) cost of constructing the roads at the rate of $10 per m2.A rectangular field is of dimensions 20 m × 15 m. two paths run parallel to the sides of the rectangle through the centre of the field. the width of the longer path is 2 m and that of the shorter path is 1 m. find that: (a) area of the paths (b) area of the remaining portion of the field. (c) cost of constructing the roads at the rate of $10 per m2.A rectangular field is of dimensions 20 m × 15 m. two paths run parallel to the sides of the rectangle through the centre of the field. the width of the longer path is 2 m and that of the shorter path is 1 m. find that: (a) area of the paths (b) area of the remaining portion of the field. (c) cost of constructing the roads at the rate of $10 per m2.A rectangular field is of dimensions 20 m × 15 m. two paths run parallel to the sides of the rectangle through the centre of the field. the width of the longer path is 2 m and that of the shorter path is 1 m. find that: (a) area of the paths (b) area of the remaining portion of the field. (c) cost of constructing the roads at the rate of $10 per m2.A rectangular field is of dimensions 20 m × 15 m. two paths run parallel to the sides of the rectangle through the centre of the field. the width of the longer path is 2 m and that of the shorter path is 1 m. find that: (a) area of the paths (b) area of the remaining portion of the field. (c) cost of constructing the roads at the rate of $10 per m2.A rectangular field is of dimensions 20 m × 15 m. two paths run parallel to the sides of the rectangle through the centre of the field. the width of the longer path is 2 m and that of the shorter path is 1 m. find that: (a) area of the paths (b) area of the remaining portion of the field. (c) cost of constructing the roads at the rate of $10 per m2.A rectangular field is of dimensions 20 m × 15 m. two paths run parallel to the sides of the rectangle through the centre of the field. the width of the longer path is 2 m and that of the shorter path is 1 m. find that: (a) area of the paths (b) area of the remaining portion of the field. (c) cost of constructing the roads at the rate of $10 per m2.A rectangular field is of dimensions 20 m × 15 m. two paths run parallel to the sides of the rectangle through the centre of the field. the width of the longer path is 2 m and that of the shorter path is 1 m. find that: (a) area of the paths (b) area of the remaining portion of the field. (c) cost of constructing the roads at the rate of $10 per m2.A rectangular field is of dimensions 20 m × 15 m. two paths run parallel to the sides of the rectangle through the centre of the field. the width of the longer path is 2 m and that of the shorter path is 1 m. find that: (a) area of the paths (b) area of the remaining portion of the field. (c) cost of constructing the roads at the rate of $10 per m2.A rectangular field is of dimensions 20 m × 15 m. two paths run parallel to the sides of the rectangle through the centre of the field. the width of the longer path is 2 m and that of the shorter path is 1 m. find that: (a) area of the paths (b) area of the remaining portion of the field. (c) cost of constructing the roads at the rate of $10 per m2.A rectangular field is of dimensions 20 m × 15 m. two paths run parallel to the sides of the rectangle through the centre of the field. the width of the longer path is 2 m and that of the shorter path is 1 m. find that: (a) area of the paths (b) area of the remaining portion of the field. (c) cost of constructing the roads at the rate of $10 per m2.

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