The answer is: " h = A / b " .
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Explanation:
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Given: " A = bh " ; Solve for "h" ;
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A = bh ;
↔ bh = A ;
Divide each side of the equation by "b" ; to isolate "h" on one side of the equation; & to solve for "h" ;
→ (bh) / b = A / b ;
to get:
→ h = A / b .
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The answer is: " h = A / b " .
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Solution:
In FGH, As, given G J bisects ∠F G H and is a perpendicular bisector of F H.
So, F J=J H →→ G J is a perpendicular bisector of F H.
We will use angle bisector theorem to determine which statement is correct.
As, Angle bisector theorem states that , if a line segment bisects an angle, then the ratio of sides adjacent to angle, is equal to the ratio of two segments where the angle bisector cuts the third side.
So,
The option (C) which is the F G H has exactly 2 congruent sides is true.
Step-by-step explanation:
If I'm understanding what a "proof" means, some answers could be:
2 + 3 = 5
4 + 15 = 19
8 + 21 = 29
Hope this helps you! Have a good night!