Question

On a coordinate plane, triangle K J L is shown. Line segment G H goes from side J K to J L. Point K is at (0, 0), point G is at (e, f), point J is at (2 e, 2 f), point H is at (e + d, f), and point L is at (2 d, 0).
To prove part of the triangle midsegment theorem using the diagram, which statement must be shown?

The length of JK equals the length of JL.
The length of GH is half the length of KL.
The slope of JK equals the slope of JL.
The slope of GH is half the slope of KL.

Answer 1

Answer:

2 statement

gh= 1/2(kl)

because,

midpt of jk=[( 0+2e/2) , (0+2f/2) ]

=(e, f)

given (e, f) is pt g

so g is midpt of jk

midpt of jl=[(2e+2d/2), (2f+0 /2) ]

=(e+d, f)

given (e+d, f) is pt h

so h is midpt of jl

by midpt thm if line segment in a triangle joining the midpoint of two sides of the triangle is said to be parallel to its third side and is also half of the length of the third side.

so

gh is half of kl

Answer 2

Answer:

B is correct

Step-by-step explanation:

I am right bc of my notes trust  me