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## Ratio in which line joining two points is divided by plane xy Solution

STEP 0: Pre-Calculation Summary
Formula Used
ratio1 = -(Z1 Coordinate in 3D Space/Z2 Coordinate in 3D Space)
R1 = -(Z1/Z2)
This formula uses 2 Variables
Variables Used
Z1 Coordinate in 3D Space - Z1 Coordinate in 3D Space is a point on z axis in 3 dimensional space corresponding to point P. (Measured in Hundred)
Z2 Coordinate in 3D Space - Z2 Coordinate in 3D Space is a point on z axis in 3 dimensional space corresponding to point Q. (Measured in Hundred)
STEP 1: Convert Input(s) to Base Unit
Z1 Coordinate in 3D Space: 2 Hundred --> 2 Hundred No Conversion Required
Z2 Coordinate in 3D Space: 5 Hundred --> 5 Hundred No Conversion Required
STEP 2: Evaluate Formula
Substituting Input Values in Formula
R1 = -(Z1/Z2) --> -(2/5)
Evaluating ... ...
R1 = -0.4
STEP 3: Convert Result to Output's Unit
-0.4 Hundred --> No Conversion Required
-0.4 Hundred <-- Ratio1
(Calculation completed in 00.000 seconds)

## < 6 Coefficient and Ratio in 3D Space Calculators

Constant coefficient of plane given perpendicular distance between plane
constant_coefficient_of_plane1 = modulus((Perpendicular Distance)+(Direction Ratio 1* X Coordinate in 3D Space)+(Direction Ratio 2* Y Coordinate in 3D Space)+(Direction Ratio 3* Z Coordinate in 3D Space)) Go
Distance from origin given standard equation of plane
distance_1 = (Constant Coefficient of Plane2)-((Length)*sqrt((Direction Ratio 1)^2+(Direction Ratio 2)^2+(Direction Ratio 3)^2)) Go
Constant coefficient of sphere given centre and radius of sphere
constant_coefficient_of_sphere = (X Coordinate of Centre of Sphere)^2+ (Y Coordinate of Centre of Sphere)^2+ (Z Coordinate of Center of Sphere)^2+ (Radius)^2 Go
Ratio in which line joining two points is divided by plane xy
ratio1 = -(Z1 Coordinate in 3D Space/Z2 Coordinate in 3D Space) Go
Ratio in which line joining two points is divided by plane zx
ratio1 = -(Y1 Coordinate in 3D Space/Y2 Coordinate in 3D Space) Go
Ratio in which line joining two points is divided by plane yz
ratio1 = -(X1 Coordinate in 3D Space/X2 Coordinate in 3D Space) Go

### Ratio in which line joining two points is divided by plane xy Formula

ratio1 = -(Z1 Coordinate in 3D Space/Z2 Coordinate in 3D Space)
R1 = -(Z1/Z2)

## What is coordinate system in 3D space?

The three mutually perpendicular lines in a space which divides the space into eight parts and if these perpendicular lines are the coordinate axes, then it is said to be a coordinate system.

## How to Calculate Ratio in which line joining two points is divided by plane xy?

Ratio in which line joining two points is divided by plane xy calculator uses ratio1 = -(Z1 Coordinate in 3D Space/Z2 Coordinate in 3D Space) to calculate the Ratio1, Ratio in which line joining two points is divided by plane xy is defined as the quotient of two z coordinates of P & Q. Ratio1 and is denoted by R1 symbol.

How to calculate Ratio in which line joining two points is divided by plane xy using this online calculator? To use this online calculator for Ratio in which line joining two points is divided by plane xy, enter Z1 Coordinate in 3D Space (Z1) & Z2 Coordinate in 3D Space (Z2) and hit the calculate button. Here is how the Ratio in which line joining two points is divided by plane xy calculation can be explained with given input values -> -0.4 = -(2/5).

### FAQ

What is Ratio in which line joining two points is divided by plane xy?
Ratio in which line joining two points is divided by plane xy is defined as the quotient of two z coordinates of P & Q and is represented as R1 = -(Z1/Z2) or ratio1 = -(Z1 Coordinate in 3D Space/Z2 Coordinate in 3D Space). Z1 Coordinate in 3D Space is a point on z axis in 3 dimensional space corresponding to point P & Z2 Coordinate in 3D Space is a point on z axis in 3 dimensional space corresponding to point Q.
How to calculate Ratio in which line joining two points is divided by plane xy?
Ratio in which line joining two points is divided by plane xy is defined as the quotient of two z coordinates of P & Q is calculated using ratio1 = -(Z1 Coordinate in 3D Space/Z2 Coordinate in 3D Space). To calculate Ratio in which line joining two points is divided by plane xy, you need Z1 Coordinate in 3D Space (Z1) & Z2 Coordinate in 3D Space (Z2). With our tool, you need to enter the respective value for Z1 Coordinate in 3D Space & Z2 Coordinate in 3D Space 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 Ratio1?
In this formula, Ratio1 uses Z1 Coordinate in 3D Space & Z2 Coordinate in 3D Space. We can use 6 other way(s) to calculate the same, which is/are as follows -
• constant_coefficient_of_plane1 = modulus((Perpendicular Distance)+(Direction Ratio 1* X Coordinate in 3D Space)+(Direction Ratio 2* Y Coordinate in 3D Space)+(Direction Ratio 3* Z Coordinate in 3D Space))
• constant_coefficient_of_sphere = (X Coordinate of Centre of Sphere)^2+ (Y Coordinate of Centre of Sphere)^2+ (Z Coordinate of Center of Sphere)^2+ (Radius)^2
• distance_1 = (Constant Coefficient of Plane2)-((Length)*sqrt((Direction Ratio 1)^2+(Direction Ratio 2)^2+(Direction Ratio 3)^2))
• ratio1 = -(Z1 Coordinate in 3D Space/Z2 Coordinate in 3D Space)
• ratio1 = -(Y1 Coordinate in 3D Space/Y2 Coordinate in 3D Space)
• ratio1 = -(X1 Coordinate in 3D Space/X2 Coordinate in 3D Space) Let Others Know