A rectangular garden has a perimeter of 48 cm and an area of 140 sq. cm. What is the length of this garden?

2 Answers
Jul 27, 2016

Length of garden is #14#

Explanation:

Let the length be #L# cm. and as area is #140# cm., it being a product of length and width, width should be #140/L#.

Hence, perimeter is #2xx(L+140/L)#, but as perimeter is #48#, we have

#2(L+140/L)=48# or #L+140/L=48/2=24#

Hence multiplying each term by #L#, we get

#L^2+140=24L# or #L^2-24L+140=0# or

#L^2-14L-10L+140=0# or

#L(L-14)-10(L-14)=0# or

#(L-14)(L-10)=0#

i.e. #L=14# or #10#.

Hence, dimensions of garden are #14# and #10# and length is more than width, it is #14#

Jul 27, 2016

The garden has sides of 14cm and 10cm. Length is 14cm.

Explanation:

We know that it is a rectangle, so each pair of opposite sides are the same length. We denote one set of sides length #x# and the other set length #y#.

Therefore, the perimeter is given by #2x+2y#.

#therefore 2x + 2y = 48cm#

The area of a rectangle is given by the product of it's length and breadth, ie

#A = xy = 140cm^2#

#implies x = 140/y#

#2(140/y) + 2y = 48#

#280/y + 2y = 48#

#140 + y^2 = 24y#

#y^2-24y + 140 = 0#

Use quadratic formula:

#y=(24+-sqrt(24^2-4(1)(140)))/2 = (24+-sqrt(16))/2 = 10 or 14#

#y=10 implies x = 14#

#y = 14 implies x = 10#