A 17 foot long lodder is leaning against a house the base of the ladder is 9 feet from the house how high up the house does the
ladder reach
1 answer:
Given: ladder = 17 m and base = 8 m
The ladder forms a right triangle with the base of 8 m, the wall will be 15 m and the ladder (hypotenuse) is 17 m.
Let’s say you did not know that this was a standard 8–15–17 right triangle.
This is how you can figure it out:
hypotenuse(h)2
2
= side21
1
2
+ side22
2
2
Let side1
1
= base and side2
2
= wall
172
2
= 82
2
+ wall2
2
wall = 172−82‾‾‾‾‾‾‾‾√
17
2
−
8
2
wall = 289−64‾‾‾‾‾‾‾‾‾√
289
−
64
wall = 225‾‾‾‾√
225
wall = 15 feet
>>>>>>>>>>15 feet
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A. Y = 10+18
B. X*3=12
C. X/3+4=5
A. 10+18= 28
B. 12/3=4
C 5-4 = 1, 1*3= 3 X=3
Answer:
x = -36
Step-by-step explanation:
x/3 + 8 = -4
x/3 = -12
x = -36