Answer:
Step-by-step explanation:
take 43 degree as reference angle
using tan rule
tan 43 = opposite / adjacent
0.93 = x / 56
x = 56/0.93
x = 60.21
x = 60.2
Subtract 5 from each side. Use MAN strategy to determine that x = 5 and x = -1.
<h2><em>The equation would be d=90t because the input is 25 for t and multiply to get 2250 feet per second</em>. </h2>
<h3>
What's the height of a cylinder formula?</h3>
There are five basic equations which completely describe the cylinder with given radius r and height h:
- Volume of a cylinder: V = π * r² * h,
- Base surface area of a cylinder: A_b = 2 * π * r²,
- Lateral surface area of a cylinder: A_l = 2 * π * r * h,
- Total surface area of a cylinder: A = A_b + A_l,
- Longest diagonal of a cylinder: d² = 4 * r² + h².
Sometimes, however, we have a different set of parameters. With this height of a cylinder calculator you can now quickly use ten various height of a cylinder formulas which can be derived directly from the above equations:
- Given radius and volume: h = V / (π * r²),
- Given radius and lateral area: h = A_l / (2 * π * r),
- Given radius and total area: h = (A - 2 * π * r²) / (2 * π * r),
- Given radius and longest diagonal: h = √(d² - 4 * r²),
- Given volume and base area: h = 2 * V / A_b,
- Given volume and lateral area: h = A_l² / (4 * π * V),
- Given base area and lateral area: h = √(A_l² / (2 * π * A_b)),
- Given base area and total area: h = (A - A_b) / √(2 * A_b * π),
- Given base area and diagonal: h = √(d² - 2 * A_b / π),
- Given lateral area and total area: h = A_l / √(2 * π * (A - A_l)).
