Final Answe
The 90-degree bend made up of 5-degree shots would require 18 shots.
Step-by-step explanation
To determine the number of shots needed to make a 90-degree bend with 5-degree shots, we can use the formula:
In this case, the total angle is 90 degrees, and each shot covers 5 degrees. Substituting these values into the formula:
![\[ \text{Number of Shots} = (90)/(5) = 18 \]](https://img.qammunity.org/2024/formulas/health/high-school/c44tr1uu8fbai0k1xd7qw6mvsjzmo4gt3p.png)
So, 18 shots are required to make the bend. Each shot contributes 5 degrees, and the sum of 18 shots at 5 degrees each equals the desired 90-degree bend.
It's essential to understand that the angle per shot is a key factor in this calculation. In this scenario, using 5-degree shots ensures a smooth and precise 90-degree turn. If the angle per shot were different, the number of shots required would vary accordingly. This formula provides a straightforward way to determine the number of shots needed to achieve a specific total angle in a sequence of equal-angle increments.
In conclusion, a 90-degree bend made up of 5-degree shots would necessitate 18 shots. This calculation simplifies the process of planning and executing precise bends in a controlled and systematic manner.