Answer:
57 3/11 square units
Explanation:
The area of a parallelogram is the product of its height and the length of the perpendicular base. The given conditions allow us to find the area two ways. Of course, the area is the same in each case, so ...
area(KLMN) = KN·LP = KL·MQ
KN·5 = KL·6 . . . . . substituting the given numbers
KL = (5/6)·KN . . . . solve for one of the lengths in terms of the other
Now, the perimeter is the sum of the side lengths, and opposite sides are the same length, so we have the relation ...
perimeter(KLMN) = KN + KL + KN + KL = 2(KN +KL)
42 = 2(KN +(5/6)KN) = (11/3)KN . . . . . substitute for KL from above
KN = 42·(3/11) . . . . . . multiply by 3/11
area(KLMN) = KN·5 = (42·3/11)·5 = 630/11 = 57 3/11
_____
Check
KN = 126/11
KL = 5/6·KN = 105/11
KN·5 = 630/11 = KL·6 = 630/11 . . . . . areas match
KL+KN = 231/11 = 21 = half the perimeter . . . . . perimeter agrees