Shweta Patil
Walchand College of Engineering (WCE), Sangli
Shweta Patil has created this Calculator and 500+ more calculators!
Shashwati Tidke
Vishwakarma Institute of Technology (VIT), Pune
Shashwati Tidke has verified this Calculator and 200+ more calculators!

11 Other formulas that you can solve using the same Inputs

Distance between two points P(x1,y1,z1) & Q(x2,y2,z2)
distance between points in 3D space=sqrt((x1 coordinate in 3D space-x2 coordinate in 3D space)^2+ (y1 coordinate in 3D space-y2 coordinate in 3D space)^2+ (z1 coordinate in 3D space-z2 coordinate in 3D space)^2) GO
y coordinate of a point given distance from origin to point and x & z coordinate of that point
y1 coordinate in 3D space= sqrt((distance in 3D space)^2- (x1 coordinate in 3D space)^2- (z1 coordinate in 3D space)^2) GO
z coordinate of a point given distance from origin to point and x & y coordinate of that point
z1 coordinate in 3D space= sqrt((distance in 3D space)^2- (x1 coordinate in 3D space)^2- (y1 coordinate in 3D space)^2) GO
Distance of a point from origin
distance in 3D space= sqrt((x1 coordinate in 3D space)^2+ (y1 coordinate in 3D space)^2+ (z1 coordinate in 3D space)^2) GO
x coordinate of point dividing the line joining P & Q externally in ratio m1:m2
x coordinate in 3D space= ((ratio1*x2 coordinate in 3D space)-(ratio2*x1 coordinate in 3D space))/(ratio1-ratio2) GO
x coordinate of point dividing the line joining P & Q internally in ratio m1:m2
x coordinate in 3D space=((ratio1*x2 coordinate in 3D space)+(ratio2*x1 coordinate in 3D space))/(ratio1+ratio2) GO
z coordinate of a point given x coordinate and Perpendicular distance of that point from y axis
z1 coordinate in 3D space=sqrt ((Perpendicular distance from point to axis)^2- (x1 coordinate in 3D space)^2) GO
y coordinate of a point given x coordinate and Perpendicular distance of that point from z axis
y1 coordinate in 3D space=sqrt ((Perpendicular distance from point to axis)^2- (x1 coordinate in 3D space)^2) GO
Perpendicular distance of a point from z axis given x & y coordinate of that point
Perpendicular distance from point to axis= sqrt ((x1 coordinate in 3D space)^2+(y1 coordinate in 3D space)^2) GO
Perpendicular distance of a point from y axis given x & z coordinate of that point
Perpendicular distance from point to axis= sqrt ((x1 coordinate in 3D space)^2+(z1 coordinate in 3D space)^2) GO
x coordinate of point dividing the line joining P & Q at middle
x coordinate in 3D space= ((x1 coordinate in 3D space+x2 coordinate in 3D space)/2) GO

7 Other formulas that calculate the same Output

x coordinate of normal given direction cosines & ⊥ distance from the origin to the plane
x coordinate in 3D space= ((Perpendicular Distance)-( Direction cosine with respect to y axis* y coordinate in 3D space)-(Direction cosine with respect to z axis* z coordinate in 3D space))/ (Direction cosine with respect to x axis) GO
x coordinate of point given ⊥ distance between plane and a point
x coordinate in 3D space=modulus(((Perpendicular Distance)+(constant coefficient of plane)-(Direction ratio 2*y coordinate in 3D space)-(Direction ratio 3*z coordinate in 3D space))/(Direction ratio 1)) GO
x coordinate of point dividing the line joining P & Q externally in ratio m1:m2
x coordinate in 3D space= ((ratio1*x2 coordinate in 3D space)-(ratio2*x1 coordinate in 3D space))/(ratio1-ratio2) GO
x coordinate of point dividing the line joining P & Q internally in ratio m1:m2
x coordinate in 3D space=((ratio1*x2 coordinate in 3D space)+(ratio2*x1 coordinate in 3D space))/(ratio1+ratio2) GO
x coordinate of centroid of triangle
x coordinate in 3D space= (x1 coordinate in 3D space+x2 coordinate in 3D space+ x3 coordinate in 3D space)/3 GO
x coordinate of foot of perpendicular N from the origin on the plane
x coordinate in 3D space= (Direction cosine with respect to x axis* Perpendicular Distance) GO
x coordinate of point dividing the line joining P & Q at middle
x coordinate in 3D space= ((x1 coordinate in 3D space+x2 coordinate in 3D space)/2) GO

x coordinate of centroid of tetrahedron Formula

x coordinate in 3D space= (x1 coordinate in 3D space+x2 coordinate in 3D space+ x3 coordinate in 3D space+x4 coordinate in 3D space)/4
x= (x1+x2+ x3+x)/4
More formulas
x coordinate of a point given distance from origin to point and y & z coordinate of that point GO
x coordinate of a point given z coordinate and Perpendicular distance of that point from y axis GO
x coordinate of a point given y coordinate and Perpendicular distance of that point from z axis GO
x coordinate of point dividing the line joining P & Q internally in ratio m1:m2 GO
x coordinate of point dividing the line joining P & Q externally in ratio m1:m2 GO
x coordinate of point dividing the line joining P & Q at middle GO
x coordinate of centroid of triangle GO
x1 coordinate of end point of line given direction ratio and x2 coordinate of other end of that line GO
x2 coordinate of end point of line given direction ratio and x1 coordinate of other end of that line GO
x2 coordinate of a line given x1 coordinate & projection of that line w.r.to x axis GO
x1 coordinate of a line given x2 coordinate & projection of that line w.r.to x axis GO
x coordinate of foot of perpendicular N from the origin on the plane GO
x coordinate of normal given direction cosines & ⊥ distance from the origin to the plane GO
x coordinate of point given ⊥ distance between plane and a point GO
x coordinate of centre of sphere given radius and y, z coordinates of sphere GO
x coordinate of centre of sphere of form x2+y2+z2+2ux +2vy+2wz+d=0 & radius of sphere GO
x coordinate of centre of sphere of form x2+y2+z2+(2u/a)x+(2v/a)y+(2w/a)z+ d/a=0 GO

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 x coordinate of centroid of tetrahedron?

x coordinate of centroid of tetrahedron calculator uses x coordinate in 3D space= (x1 coordinate in 3D space+x2 coordinate in 3D space+ x3 coordinate in 3D space+x4 coordinate in 3D space)/4 to calculate the x coordinate in 3D space, x coordinate of centroid of tetrahedron is defined as a point corresponding to centroid of tetrahedron and x axis. x coordinate in 3D space and is denoted by x symbol.

How to calculate x coordinate of centroid of tetrahedron using this online calculator? To use this online calculator for x coordinate of centroid of tetrahedron, enter x1 coordinate in 3D space (x1), x2 coordinate in 3D space (x2), x3 coordinate in 3D space (x3) and x4 coordinate in 3D space (x) and hit the calculate button. Here is how the x coordinate of centroid of tetrahedron calculation can be explained with given input values -> 2.25 = (2+3+ 2+2)/4.

FAQ

What is x coordinate of centroid of tetrahedron?
x coordinate of centroid of tetrahedron is defined as a point corresponding to centroid of tetrahedron and x axis and is represented as x= (x1+x2+ x3+x)/4 or x coordinate in 3D space= (x1 coordinate in 3D space+x2 coordinate in 3D space+ x3 coordinate in 3D space+x4 coordinate in 3D space)/4. x1 coordinate in 3D space is a point on x axis in 3 dimensional space corresponding to point P, x2 coordinate in 3D space is a point on x axis in 3 dimensional space corresponding to point Q, x3 coordinate in 3D space is defined as a point on x axis in 3D space and x4 coordinate in 3D space is defined as a point on x axis in 3D space.
How to calculate x coordinate of centroid of tetrahedron?
x coordinate of centroid of tetrahedron is defined as a point corresponding to centroid of tetrahedron and x axis is calculated using x coordinate in 3D space= (x1 coordinate in 3D space+x2 coordinate in 3D space+ x3 coordinate in 3D space+x4 coordinate in 3D space)/4. To calculate x coordinate of centroid of tetrahedron, you need x1 coordinate in 3D space (x1), x2 coordinate in 3D space (x2), x3 coordinate in 3D space (x3) and x4 coordinate in 3D space (x). With our tool, you need to enter the respective value for x1 coordinate in 3D space, x2 coordinate in 3D space, x3 coordinate in 3D space and x4 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 x coordinate in 3D space?
In this formula, x coordinate in 3D space uses x1 coordinate in 3D space, x2 coordinate in 3D space, x3 coordinate in 3D space and x4 coordinate in 3D space. We can use 7 other way(s) to calculate the same, which is/are as follows -
  • x coordinate in 3D space=((ratio1*x2 coordinate in 3D space)+(ratio2*x1 coordinate in 3D space))/(ratio1+ratio2)
  • x coordinate in 3D space= ((ratio1*x2 coordinate in 3D space)-(ratio2*x1 coordinate in 3D space))/(ratio1-ratio2)
  • x coordinate in 3D space= ((x1 coordinate in 3D space+x2 coordinate in 3D space)/2)
  • x coordinate in 3D space= (x1 coordinate in 3D space+x2 coordinate in 3D space+ x3 coordinate in 3D space)/3
  • x coordinate in 3D space= (Direction cosine with respect to x axis* Perpendicular Distance)
  • x coordinate in 3D space= ((Perpendicular Distance)-( Direction cosine with respect to y axis* y coordinate in 3D space)-(Direction cosine with respect to z axis* z coordinate in 3D space))/ (Direction cosine with respect to x axis)
  • x coordinate in 3D space=modulus(((Perpendicular Distance)+(constant coefficient of plane)-(Direction ratio 2*y coordinate in 3D space)-(Direction ratio 3*z coordinate in 3D space))/(Direction ratio 1))
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