Math, asked by JMVarma514, 8 months ago

In the given figure}. ABC. is a triangle in which LC = 90°, AE is the bisector of LBAC and AG = BG = GF. Prove that ..!._ LABF. 10

Answers

Answered by aa2061458
1

Step-by-step explanation:

Measure the lengths of segments from the figure and fill in the boxes in the

Measure the lengths of segments from the figure and fill in the boxes in thefollowing table.

Measure the lengths of segments from the figure and fill in the boxes in thefollowing table.l(AG) =

Measure the lengths of segments from the figure and fill in the boxes in thefollowing table.l(AG) =I(GR) = l(AG):1(GR) =

Measure the lengths of segments from the figure and fill in the boxes in thefollowing table.l(AG) =I(GR) = l(AG):1(GR) =l(BG) =

Measure the lengths of segments from the figure and fill in the boxes in thefollowing table.l(AG) =I(GR) = l(AG):1(GR) =l(BG) =I(GQ) = l(BG):1(GQ) =

Measure the lengths of segments from the figure and fill in the boxes in thefollowing table.l(AG) =I(GR) = l(AG):1(GR) =l(BG) =I(GQ) = l(BG):1(GQ) =I(CG)

Measure the lengths of segments from the figure and fill in the boxes in thefollowing table.l(AG) =I(GR) = l(AG):1(GR) =l(BG) =I(GQ) = l(BG):1(GQ) =I(CG)I(GP) = l(CG):1(GP) =

Measure the lengths of segments from the figure and fill in the boxes in thefollowing table.l(AG) =I(GR) = l(AG):1(GR) =l(BG) =I(GQ) = l(BG):1(GQ) =I(CG)I(GP) = l(CG):1(GP) =Observe that all of these ratios are nearly 2:1.

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