Question

In the parallelogram find: the value of x, total perimeter and area of DEIK?

Answer 1

Perimeter of `DEIK = 14+4sqrt(21) ~~ 32.33`

Area of `DEIK =12sqrt(21) ~~ 54.99`

Explanation:

From the diagram:

`EI = 4 = FH`

FGH forms a right angle triangle:

`FH=4, GH=10`

By Pyrthagoroius:

`GH^2=FH^2+FG^2`
`:. 100=16+FG^2`
`:. FG^2 = 84`
`:. FG = 2sqrt(21)`

From the diagram:

`KJ=2x=FG`
`:. 2x= 2sqrt(21)`
`:. x= sqrt(21)`

To calculate the perimeter of `DEIK`

`P = DE+EI+IJ+JK+DK`
`\ \ \ = x+4+x+2x+10`
`\ \ \ = 14+4x`
`\ \ \ = 14+4sqrt(21)`
`\ \ \ ~~ 32.33`

To calculate the area of `DEIK`

`A = "Area rect DEIJ" + "Area"triangle DJK`
`\ \ \ = DE*EI + 1/2(KJ)(DJ)`
`\ \ \ = x*4 + 1/2(2x)(4)`
`\ \ \ = 4x + 8x`
`\ \ \ = 12x`
`\ \ \ = 12sqrt(21)`
`\ \ \ ~~ 54.99`