Answer:
Length of the longest metal rod which can be carried horizontally around the right-angle turn is 21.21ft
Step-by-step explanation:
Length of the longest metal rod which can be carried horizontally around the right-angle turn, can be determined at the point at where the distance between one end of rod and the 7feet corridor is same as the distance between other end of the rod and the 8feet corridor. How do I mean.
The length of longest metal rod will be determined when distance between the one end of rod and the 7feet corridor and the distance between other end of the rod and the 8feet corridor are both 15ft (7ft + 8ft).
See attachment for illustration.
Therefore using Pythagoras theorem we can find the length of longest metal rod that can be carried horizontally around the right angle turn
See illustration in attachment
i.e
Hyp² = opp²+adj²
Hyp = √(15²+15²)
Hyp = √450
Hyp = 21.21ft
