A ladder 13 metres long stands at one side of a path, its top touching a wall on
the other side of the path at a height of 12

Question

A ladder 13 metres long stands at one side of a path, its top touching a wall on the other side of the path at a height of 12 metres. Find the width of the path.​

Nevaeh · Answer

Answer:      Step-by-step explanation:   Length of ladder =13 m.      BC=12m,AC=13 m.      In ΔABC,      AB    2    +BC    2    =C    2             (Pythagoras theorem)      AB    2    =AC    2    −BC    2          =13    2    −12    2          =169−144      =25      ∴AB=5 m.      ∴ The distance of the foot of the ladder from the base of the wall =5 m

Everleigh · Answer

Answer:   base is 5 m hope it helps you   Step-by-step explanation:   according to the question we know it is a right angle triangle  Here,  perpendicular Height = 12m  Hypotenuse = 13m  Base = ?  So, by Pythagoras theorem    Hypotenuse^{2} = height^2 + base^2  13^2 = 12^2 + base^2  169 = 144 + base^2  169-144 = base^2  25 = base^2  5 = base

Samantha

If X and Y are complementary angles then show that:

a) sin^2X+sin^2Y=1

Solve the equation
2(x-3)+5=x-4
Please solve the equation with steps

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A ladder 13 metres long stands at one side of a path, its top touching a wall onthe other side of the path at a height of 12