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## Slope angle beta of Ramp given angle alpha between opposite side and hypotenuse Solution

STEP 0: Pre-Calculation Summary
Formula Used
angle_b = (pi/2)-Angle A
∠B = (pi/2)-∠A
This formula uses 1 Constants, 1 Variables
Constants Used
pi - Archimedes' constant Value Taken As 3.14159265358979323846264338327950288
Variables Used
Angle A - The angle A the space between two intersecting lines or surfaces at or close to the point where they meet. (Measured in Degree)
STEP 1: Convert Input(s) to Base Unit
Angle A: 30 Degree --> 0.5235987755982 Radian (Check conversion here)
STEP 2: Evaluate Formula
Substituting Input Values in Formula
∠B = (pi/2)-∠A --> (pi/2)-0.5235987755982
Evaluating ... ...
∠B = 1.0471975511967
STEP 3: Convert Result to Output's Unit
1.0471975511967 Radian -->60.0000000000169 Degree (Check conversion here)
60.0000000000169 Degree <-- Angle B
(Calculation completed in 00.000 seconds)

## < 5 Angle of Ramp Calculators

Slope angle beta of Ramp given both sides
angle_b = (pi/2)-(arccos(((Side B^2)+((Side A^2)+(Side B^2))-(Side A^2))/(2*Side B*(sqrt((Side A^2)+(Side B^2)))))) Go
Slope angle beta of Ramp given both sides and hypotenuse
angle_b = (pi/2)-(arccos(((Side B^2)+(Hypotenuse of Ramp^2)-(Side A^2))/(2*Side B*Hypotenuse of Ramp))) Go
Angle alpha between opposite side and hypotenuse of Ramp given both sides and hypotenuse
angle_a = arccos(((Side B^2)+(Hypotenuse of Ramp^2)-(Side A^2))/(2*Side B*Hypotenuse of Ramp)) Go
Slope angle beta of Ramp given angle alpha between opposite side and hypotenuse
angle_b = (pi/2)-Angle A Go
Angle alpha between opposite side and hypotenuse of Ramp given slope angle beta
angle_a = (pi/2)-Angle B Go

### Slope angle beta of Ramp given angle alpha between opposite side and hypotenuse Formula

angle_b = (pi/2)-Angle A
∠B = (pi/2)-∠A

## What is Ramp?

An inclined plane, also known as a ramp, is a flat supporting surface tilted at an angle, with one end higher than the other, used as an aid for raising or lowering a load. The inclined plane is one of the six classical simple machines defined by Renaissance scientists.

## How to Calculate Slope angle beta of Ramp given angle alpha between opposite side and hypotenuse?

Slope angle beta of Ramp given angle alpha between opposite side and hypotenuse calculator uses angle_b = (pi/2)-Angle A to calculate the Angle B, Slope angle beta of Ramp given angle alpha between opposite side and hypotenuse formula is defined as an angle between side a and hypotenuse of Ramp. Angle B and is denoted by ∠B symbol.

How to calculate Slope angle beta of Ramp given angle alpha between opposite side and hypotenuse using this online calculator? To use this online calculator for Slope angle beta of Ramp given angle alpha between opposite side and hypotenuse, enter Angle A (∠A) and hit the calculate button. Here is how the Slope angle beta of Ramp given angle alpha between opposite side and hypotenuse calculation can be explained with given input values -> 60 = (pi/2)-0.5235987755982.

### FAQ

What is Slope angle beta of Ramp given angle alpha between opposite side and hypotenuse?
Slope angle beta of Ramp given angle alpha between opposite side and hypotenuse formula is defined as an angle between side a and hypotenuse of Ramp and is represented as ∠B = (pi/2)-∠A or angle_b = (pi/2)-Angle A. The angle A the space between two intersecting lines or surfaces at or close to the point where they meet.
How to calculate Slope angle beta of Ramp given angle alpha between opposite side and hypotenuse?
Slope angle beta of Ramp given angle alpha between opposite side and hypotenuse formula is defined as an angle between side a and hypotenuse of Ramp is calculated using angle_b = (pi/2)-Angle A. To calculate Slope angle beta of Ramp given angle alpha between opposite side and hypotenuse, you need Angle A (∠A). With our tool, you need to enter the respective value for Angle A and hit the calculate button. You can also select the units (if any) for Input(s) and the Output as well.
How many ways are there to calculate Angle B?
In this formula, Angle B uses Angle A. We can use 5 other way(s) to calculate the same, which is/are as follows -
• angle_a = arccos(((Side B^2)+(Hypotenuse of Ramp^2)-(Side A^2))/(2*Side B*Hypotenuse of Ramp))
• angle_b = (pi/2)-Angle A
• angle_b = (pi/2)-(arccos(((Side B^2)+(Hypotenuse of Ramp^2)-(Side A^2))/(2*Side B*Hypotenuse of Ramp)))
• angle_b = (pi/2)-(arccos(((Side B^2)+((Side A^2)+(Side B^2))-(Side A^2))/(2*Side B*(sqrt((Side A^2)+(Side B^2))))))
• angle_a = (pi/2)-Angle B
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