Which statement proves that quadrilateral JKLM is a kite?
2 answers:
A quadrilateral is a kite if the diagonals are: i) perpendicular ii) bisect each other iii) not equal ( together with conditions i and ii this would make the quadrilateral a square) Another definition of the kite is : a quadrilateral with 2 pairs of equal adjacent sides. Let's check the choices one by one: A. <span>∠M is a right angle and MK bisects ∠LMJ. according to these, ML and MJ may well be not equal... </span><span>B. LM = JM = 3 and JK = LK = √17. </span> this makes the quadrilateral a kite. <span>C. MK intersects LJ at its midpoint </span> if they are not perpendicular, the quadrilateral is not a kite. <span>D. The slope of MK is –1 and the slope of LJ is 1. this only means that MK and LJ are perpendicular, but not whether they bisect each other, Answer: only B</span>
Answer:
b i jus did this on edg n got it right:)
Step-by-step explanation:
You might be interested in
Answer: P(multiple of 4) = 3/15 = 1/5
Answer:
B.) 51/64
Step-by-step explanation:
If its perimeter, it should be quite easy to find. Just add 12+9+15. Which equals 36. So the perimeter is 36 inches. -Hope it helps!
Answer:
The radius of convergence is half of the length of the interval of convergence. If the radius of convergence is R then the interval of convergence will include the open interval: (a − R, a + R). To find the radius of convergence, R, you use the Ratio Test.
Answer:
2/10 or 1/5 if you want it simplified
Step-by-step explanation:
9/10 is basically 9 and 7/10 is 7 so 9 - 7 is 2 and we need to add the /10 back so it's 2/10 or 1/5