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Walchand College of Engineering (WCE), Sangli
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## x coordinate of point of tangency of Parabola Solution

STEP 0: Pre-Calculation Summary
Formula Used
x_coordinate_1 = (Focal distance of Parabola/Slope of Line^2)
Xcoordinate1 = (Dfocal_Parabola/m^2)
This formula uses 2 Variables
Variables Used
Focal distance of Parabola - Focal distance of Parabola is the distance from vertex of parabola to the focus. (Measured in Meter)
Slope of Line- The Slope of Line is a number that measures its "steepness", usually denoted by the letter m. It is the change in y for a unit change in x along the line.
STEP 1: Convert Input(s) to Base Unit
Focal distance of Parabola: 5 Meter --> 5 Meter No Conversion Required
Slope of Line: 4 --> No Conversion Required
STEP 2: Evaluate Formula
Substituting Input Values in Formula
Xcoordinate1 = (Dfocal_Parabola/m^2) --> (5/4^2)
Evaluating ... ...
Xcoordinate1 = 0.3125
STEP 3: Convert Result to Output's Unit
0.3125 --> No Conversion Required
0.3125 <-- X coordinate 1
(Calculation completed in 00.000 seconds)

## < 10+ Coordinates of Parabola Calculators

x coordinate of focus of Parabola with its vertex opening horizontally
x_coordinate_of_focus_of_parabola = X coordinate of vertex of Parabola+ (1/4*Focal distance of Parabola) Go
x coordinate of point of tangency of Parabola
x_coordinate_1 = (Focal distance of Parabola/Slope of Line^2) Go
x coordinate of focus of Parabola with its vertex at opening vertically
x_coordinate_of_focus_of_parabola = X coordinate of vertex of Parabola Go
y coordinate of extremities of latusractum of Parabola opening to right
y_coordinate_1 = (2*Focal distance of Parabola) Go
y coordinate of extremities of latusractum of Parabola opening downwards
y_coordinate_1 = -(Focal distance of Parabola) Go
x coordinate of extremities of latusractum of Parabola opening to left
x_coordinate_1 = -(Focal distance of Parabola) Go
x coordinate of extremities of latusractum of Parabola opening downwards
x_coordinate_1 = 2*Focal distance of Parabola Go
x coordinate of extremities of latusractum of Parabola opening upwards
x_coordinate_1 = 2*Focal distance of Parabola Go
x coordinate of extremities of latusractum of Parabola opening to right
x_coordinate_1 = Focal distance of Parabola Go
y coordinate of extremities of latusractum of Parabola opening upwards
y_coordinate_1 = Focal distance of Parabola Go

### x coordinate of point of tangency of Parabola Formula

x_coordinate_1 = (Focal distance of Parabola/Slope of Line^2)
Xcoordinate1 = (Dfocal_Parabola/m^2)

## How to calculate the x coordinate of Point of tangency of parabola?

A line touching the parabola is said to be a tangent to the parabola provided it satisfies certain conditions. If we have a line y = mx + c touching a parabola y2 = 4ax, then c = a/m.

## How to Calculate x coordinate of point of tangency of Parabola?

x coordinate of point of tangency of Parabola calculator uses x_coordinate_1 = (Focal distance of Parabola/Slope of Line^2) to calculate the X coordinate 1, x coordinate of point of tangency of Parabola is defined as a point on x axis of parabola corresponding to tangent. X coordinate 1 and is denoted by Xcoordinate1 symbol.

How to calculate x coordinate of point of tangency of Parabola using this online calculator? To use this online calculator for x coordinate of point of tangency of Parabola, enter Focal distance of Parabola (Dfocal_Parabola) & Slope of Line (m) and hit the calculate button. Here is how the x coordinate of point of tangency of Parabola calculation can be explained with given input values -> 0.3125 = (5/4^2).

### FAQ

What is x coordinate of point of tangency of Parabola?
x coordinate of point of tangency of Parabola is defined as a point on x axis of parabola corresponding to tangent and is represented as Xcoordinate1 = (Dfocal_Parabola/m^2) or x_coordinate_1 = (Focal distance of Parabola/Slope of Line^2). Focal distance of Parabola is the distance from vertex of parabola to the focus & The Slope of Line is a number that measures its "steepness", usually denoted by the letter m. It is the change in y for a unit change in x along the line.
How to calculate x coordinate of point of tangency of Parabola?
x coordinate of point of tangency of Parabola is defined as a point on x axis of parabola corresponding to tangent is calculated using x_coordinate_1 = (Focal distance of Parabola/Slope of Line^2). To calculate x coordinate of point of tangency of Parabola, you need Focal distance of Parabola (Dfocal_Parabola) & Slope of Line (m). With our tool, you need to enter the respective value for Focal distance of Parabola & Slope of Line 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 X coordinate 1?
In this formula, X coordinate 1 uses Focal distance of Parabola & Slope of Line. We can use 10 other way(s) to calculate the same, which is/are as follows -
• x_coordinate_1 = 2*Focal distance of Parabola
• x_coordinate_1 = 2*Focal distance of Parabola
• x_coordinate_1 = Focal distance of Parabola
• x_coordinate_1 = -(Focal distance of Parabola)
• x_coordinate_of_focus_of_parabola = X coordinate of vertex of Parabola+ (1/4*Focal distance of Parabola)
• x_coordinate_of_focus_of_parabola = X coordinate of vertex of Parabola
• x_coordinate_1 = (Focal distance of Parabola/Slope of Line^2)
• y_coordinate_1 = -(Focal distance of Parabola)
• y_coordinate_1 = Focal distance of Parabola
• y_coordinate_1 = (2*Focal distance of Parabola)
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