Best Answer

8*15 = 120 square cm

Check with Pythagoras' theorem: 82+152 = 289 and the square root of this is 17cm

Also: 8+8+15+15 = 46cm

Q: If the Diagonal of a rectangle is 17cm long and its perimeter is 46cmFind the area of a rectangle?

Write your answer...

Submit

Still have questions?

Continue Learning about Math & Arithmetic

17cm is 0.00017km

A regular pentagon has 5 equal length sides. So 17/5 = 3.4 cm per side.

If the quadrilateral is a rectangle, the diagonal forms the hypotenuse of a right triangle with either pair of adjacent sides. Such a right triangle follows the Pythagorean theorem that the square of the hypotenuse of a right triangle equals the sum of the squares of the other two sides. Calculation shows that the square root of the sum of the squares of the two sides is about 31.06449. Therefore, given the significant digits of the specified sides, the quadrilateral may be a rectangle, because the exact answer reduced to two significant digits is 31. If the sides were specified as 17.0000 and 26.0000, the figure would not be a strict rectangle, but would be very close to one.

17cm

Circumference = 17*pi

Related questions

what is the perimeter of the parallelogram 20cm 30cm 17cm=100

Any shape you want. "Perimeter" is not some esoteric function, it is merely the total measurement of the sides of the figure.

17cm is 0.00017km

1m 17cm > 109cm--1m 17cm = 117cm117cm > 109cm

1.35m add 17cm = 18.35

A regular pentagon has 5 equal length sides. So 17/5 = 3.4 cm per side.

17 centimeters are 6.69291 inches.

If the quadrilateral is a rectangle, the diagonal forms the hypotenuse of a right triangle with either pair of adjacent sides. Such a right triangle follows the Pythagorean theorem that the square of the hypotenuse of a right triangle equals the sum of the squares of the other two sides. Calculation shows that the square root of the sum of the squares of the two sides is about 31.06449. Therefore, given the significant digits of the specified sides, the quadrilateral may be a rectangle, because the exact answer reduced to two significant digits is 31. If the sides were specified as 17.0000 and 26.0000, the figure would not be a strict rectangle, but would be very close to one.

53.41 cm

17cm

=17cm

17cm