Asked by Anon
Ray BD bisects ∠ABC so that m∠ABD = 5y – 3 and m∠CBD = 2y +12. Find the value of y.
The midpoint of Line Segment AB is (2, -9). The coordinates of one endpoint are A (4, 10). Find the coordinates of endpoint B.
Find the distance between points F (7, 21) and G (-5, 18) to the nearest tenth.
The midpoint of Line Segment AB is (2, -9). The coordinates of one endpoint are A (4, 10). Find the coordinates of endpoint B.
Find the distance between points F (7, 21) and G (-5, 18) to the nearest tenth.
Answers
Answered by
Reiny
"bisect" means to cut into equal parts.
Thus: 5y – 3 = 2y +12
etc
#2 , let the endpoint be (x,y)
for the x:
(4+x)/2 = 2
4+x = 4
x = 0
for the y:
---- your turn
#3, just use your "distance between 2 points" formula
Thus: 5y – 3 = 2y +12
etc
#2 , let the endpoint be (x,y)
for the x:
(4+x)/2 = 2
4+x = 4
x = 0
for the y:
---- your turn
#3, just use your "distance between 2 points" formula
Answered by
brandon
not helpful need answer
Answered by
Unknown helper
5y-3-2y=12
3y-3=12
3y-3+3=12+3
3y=15
y=5
3y-3=12
3y-3+3=12+3
3y=15
y=5
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