Side (a) of Ramp given Surface area (A),Side (b),Hypotenuse (c) and Width (w) Calculator

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✖area ramp is defined as the amount of space covered by ramp in given plane.ⓘ area ramp [A]			+10% -10%
✖Width is the measurement or extent of something from side to side.ⓘ Width [w]			+10% -10%
✖Side B is an upright or sloping surface of a structure or object that is not the top or bottom and generally not the front or back.ⓘ Side B [b]			+10% -10%
✖The hypotenuse is the longest side of the right-angled triangle and it is the opposite side of the right angle.ⓘ Hypotenuse [h]			+10% -10%

✖Side A is an upright or sloping surface of a structure or object that is not the top or bottom and generally not the front or back.ⓘ Side (a) of Ramp given Surface area (A),Side (b),Hypotenuse (c) and Width (w) [a]

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Shweta Patil

Walchand College of Engineering (WCE), Sangli

Shweta Patil has created this Calculator and 1000+ more calculators!

Mona Gladys

St Joseph's College (St Joseph's College), Bengaluru

Mona Gladys has verified this Calculator and 500+ more calculators!

Side (a) of Ramp given Surface area (A),Side (b),Hypotenuse (c) and Width (w) Solution

STEP 0: Pre-Calculation Summary

Formula Used

side_a = (area ramp-(Width*(Side B+Hypotenuse)))/(Side B+Width)
a = (A-(w*(b+h)))/(b+w)
This formula uses 4 Variables

Variables Used

area ramp - area ramp is defined as the amount of space covered by ramp in given plane. (Measured in Square Meter)
Width - Width is the measurement or extent of something from side to side. (Measured in Meter)
Side B - Side B is an upright or sloping surface of a structure or object that is not the top or bottom and generally not the front or back. (Measured in Meter)
Hypotenuse - The hypotenuse is the longest side of the right-angled triangle and it is the opposite side of the right angle. (Measured in Meter)

STEP 1: Convert Input(s) to Base Unit

area ramp: 1000 Square Meter --> 1000 Square Meter No Conversion Required
Width: 7 Meter --> 7 Meter No Conversion Required
Side B: 7 Meter --> 7 Meter No Conversion Required
Hypotenuse: 5 Meter --> 5 Meter No Conversion Required

STEP 2: Evaluate Formula

Substituting Input Values in Formula

a = (A-(w*(b+h)))/(b+w) --> (1000-(7*(7+5)))/(7+7)

Evaluating ... ...

a = 65.4285714285714

STEP 3: Convert Result to Output's Unit

65.4285714285714 Meter --> No Conversion Required

FINAL ANSWER

65.4285714285714 Meter <-- Side A

(Calculation completed in 00.016 seconds)

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Side (a) of Ramp given Surface area (A),Side (b),Hypotenuse (c) and Width (w)

< 11 Other formulas that you can solve using the same Inputs

Area of a Triangle when sides are given

area = sqrt((Side A+Side B+Side C)*(Side B+Side C-Side A)*(Side A-Side B+Side C)*(Side A+Side B-Side C))/4 Go

Radius of Inscribed Circle

radius_of_inscribed_circle = sqrt((Semiperimeter Of Triangle -Side A)*(Semiperimeter Of Triangle -Side B)*(Semiperimeter Of Triangle -Side C)/Semiperimeter Of Triangle ) Go

Area of Triangle when semiperimeter is given

area_of_triangle = sqrt(Semiperimeter Of Triangle *(Semiperimeter Of Triangle -Side A)*(Semiperimeter Of Triangle -Side B)*(Semiperimeter Of Triangle -Side C)) Go

Side a of a triangle

side_a = sqrt((Side B)^2+(Side C)^2-2*Side B*Side C*cos(Angle A)) Go

Surface Area of a Rectangular Prism

surface_area = 2*(Length*Width+Length*Height+Width*Height) Go

Perimeter of a Right Angled Triangle

perimeter = Side A+Side B+sqrt(Side A^2+Side B^2) Go

Radius of circumscribed circle

radius_of_circumscribed_circle = (Side A*Side B*Side C)/(4*Area Of Triangle) Go

Perimeter of Triangle

perimeter_of_triangle = Side A+Side B+Side C Go

Perimeter of a Parallelogram

perimeter = 2*Side A+2*Side B Go

Perimeter of a rectangle when length and width are given

perimeter = 2*Length+2*Width Go

Perimeter of an Isosceles Triangle

perimeter = Side A+2*Side B Go

< 11 Other formulas that calculate the same Output

Side a of a triangle

side_a = sqrt((Side B)^2+(Side C)^2-2*Side B*Side C*cos(Angle A)) Go

Side of Rhombus when area and angle are given

side_a = sqrt(Area)/sqrt(sin(Angle Between Sides)) Go

Side a of a triangle given side b, angles A and B

side_a = (Side B*sin(Angle A))/sin(Angle B) Go

Side of a parallelogram when diagonal and the other side is given

side_a = sqrt(2*(Diagonal 1)^2+2*(Diagonal 2)^2-4*(Side B)^2)/2 Go

Side of a Kite when other side and area are given

side_a = (Area*cosec(Angle Between Sides))/Side B Go

Side of a Rhombus when Diagonals are given

side_a = sqrt((Diagonal 1)^2+(Diagonal 2)^2)/2 Go

Side 'a' of a parallelogram if angle related to the side and height is known

side_a = Height of column 2/sin(Angle A) Go

Side of the parallelogram when the height and sine of an angle are given

side_a = Height/sin(Theta) Go

Side of a Kite when other side and perimeter are given

side_a = (Perimeter/2)-Side B Go

Side of the parallelogram when the area and height of the parallelogram are given

side_a = Area/Height Go

Side of Rhombus when area and height are given

side_a = Area/Height Go

Side (a) of Ramp given Surface area (A),Side (b),Hypotenuse (c) and Width (w) Formula

side_a = (area ramp-(Width*(Side B+Hypotenuse)))/(Side B+Width)
a = (A-(w*(b+h)))/(b+w)

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 Side (a) of Ramp given Surface area (A),Side (b),Hypotenuse (c) and Width (w)?

Side (a) of Ramp given Surface area (A),Side (b),Hypotenuse (c) and Width (w) calculator uses side_a = (area ramp-(Width*(Side B+Hypotenuse)))/(Side B+Width) to calculate the Side A, The Side (a) of Ramp given Surface area (A),Side (b),Hypotenuse (c) and Width (w) formula is defined as a straight line connecting two adjacent vertices of Ramp. Side A and is denoted by a symbol.

How to calculate Side (a) of Ramp given Surface area (A),Side (b),Hypotenuse (c) and Width (w) using this online calculator? To use this online calculator for Side (a) of Ramp given Surface area (A),Side (b),Hypotenuse (c) and Width (w), enter area ramp (A), Width (w), Side B (b) and Hypotenuse (h) and hit the calculate button. Here is how the Side (a) of Ramp given Surface area (A),Side (b),Hypotenuse (c) and Width (w) calculation can be explained with given input values -> 708.2857 = (10000-(7*(7+5)))/(7+7).

FAQ

What is Side (a) of Ramp given Surface area (A),Side (b),Hypotenuse (c) and Width (w)?

The Side (a) of Ramp given Surface area (A),Side (b),Hypotenuse (c) and Width (w) formula is defined as a straight line connecting two adjacent vertices of Ramp and is represented as a = (A-(w*(b+h)))/(b+w) or side_a = (area ramp-(Width*(Side B+Hypotenuse)))/(Side B+Width). area ramp is defined as the amount of space covered by ramp in given plane, Width is the measurement or extent of something from side to side, Side B is an upright or sloping surface of a structure or object that is not the top or bottom and generally not the front or back and The hypotenuse is the longest side of the right-angled triangle and it is the opposite side of the right angle.

How to calculate Side (a) of Ramp given Surface area (A),Side (b),Hypotenuse (c) and Width (w)?

The Side (a) of Ramp given Surface area (A),Side (b),Hypotenuse (c) and Width (w) formula is defined as a straight line connecting two adjacent vertices of Ramp is calculated using side_a = (area ramp-(Width*(Side B+Hypotenuse)))/(Side B+Width). To calculate Side (a) of Ramp given Surface area (A),Side (b),Hypotenuse (c) and Width (w), you need area ramp (A), Width (w), Side B (b) and Hypotenuse (h). With our tool, you need to enter the respective value for area ramp, Width, Side B and Hypotenuse 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 Side A?

In this formula, Side A uses area ramp, Width, Side B and Hypotenuse. We can use 11 other way(s) to calculate the same, which is/are as follows -

side_a = sqrt((Side B)^2+(Side C)^2-2*Side B*Side C*cos(Angle A))
side_a = (Area*cosec(Angle Between Sides))/Side B
side_a = (Perimeter/2)-Side B
side_a = sqrt((Diagonal 1)^2+(Diagonal 2)^2)/2
side_a = Area/Height
side_a = sqrt(Area)/sqrt(sin(Angle Between Sides))
side_a = sqrt(2*(Diagonal 1)^2+2*(Diagonal 2)^2-4*(Side B)^2)/2
side_a = Height/sin(Theta)
side_a = Area/Height
side_a = (Side B*sin(Angle A))/sin(Angle B)
side_a = Height of column 2/sin(Angle A)

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