Shweta Patil
Walchand College of Engineering (WCE), Sangli
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Nishan Poojary
Shri Madhwa Vadiraja Institute of Technology and Management (SMVITM), Udupi
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11 Other formulas that you can solve using the same Inputs

Force Between Parallel Wires
magnetic force per unit length=([Permeability-vacuum]*Electric Current in Conductor 1*Electric Current in Conductor 2)/(2*pi*Perpendicular Distance) GO
Direction cosine w.r.to x axis given direction ratio 1,2 & 3
Direction cosine with respect to z axis= (Direction ratio 1)/sqrt((Direction ratio 1)^2+(Direction ratio 2)^2+(Direction ratio 3)^2) GO
Direction cosine w.r.to y axis given direction ratio 1,2 & 3
Direction cosine with respect to y axis= (Direction ratio 2)/sqrt((Direction ratio 1)^2+(Direction ratio 2)^2+(Direction ratio 3)^2) GO
Direction cosine w.r.to z axis given direction ratio 1,2 & 3
Direction cosine with respect to z axis= (Direction ratio 3)/sqrt((Direction ratio 1)^2+(Direction ratio 2)^2+(Direction ratio 3)^2) GO
Magnetic Field Due to a Straight Conductor
Magnetic Field=([Permeability-vacuum]*Electric Current/4*pi*Perpendicular Distance)*(cos(Theta 1)-cos(Theta 2)) GO
Magnetic Field on the Axis of a Ring
Magnetic Field=([Permeability-vacuum]*Electric Current*Radius^2)/(2*(Radius^2+Perpendicular Distance^2)^(3/2)) GO
Magnetic Field Due to an Infinite Straight Wire
Magnetic Field=([Permeability-vacuum]*Electric Current)/(2*pi*Perpendicular Distance) GO
x1 coordinate of end point of line given direction ratio and x2 coordinate of other end of that line
x1 coordinate in 3D space= Direction ratio 1-x2 coordinate in 3D space GO
x2 coordinate of end point of line given direction ratio and x1 coordinate of other end of that line
x2 coordinate in 3D space= Direction ratio 1-x1 coordinate in 3D space GO
y1 coordinate of end point of line given direction ratio and y2 coordinate of other end of that line
y1 coordinate in 3D space= Direction ratio 1-y2 coordinate in 3D space GO
Chord length when radius and perpendicular distance are given
Chord Length=sqrt(Radius^2-Perpendicular Distance^2)*2 GO

2 Other formulas that calculate the same Output

D in std equation of a plane given dist. b/w || planes,D.R.s taking dist. -ve
constant coefficient of plane=constant coefficient of plane2+(Distance Between Line*((Direction ratio 1^2)+(Direction ratio 2^2)+(Direction ratio 3^2))^0.5) GO
D in std equation of plane using dist. b/w 2 || planes,D.R.s when distance is positive
constant coefficient of plane=(constant coefficient of plane2)-((Length)*sqrt((Direction ratio 1)^2+(Direction ratio 2)^2+(Direction ratio 3)^2)) GO

constant coefficient of plane given ⊥ distance between plane and a point and coordinates of point Formula

constant coefficient of plane= 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))
p= modulus((d)+(d1* x)+(d2* y)+(d3* z))
More formulas
ratio in which line joining two points P & Q is divided by plane xy GO
ratio in which line joining two points P & Q is divided by plane zx GO
ratio in which line joining two points P & Q is divided by plane yz GO
Relation between direction cosines of coordinate axes GO
constant coefficient of plane 2 given distance between 2 || planes & direction ratios of planes GO
D in std equation of plane using dist. b/w 2 || planes,D.R.s when distance is positive GO
constant coefficient of sphere given centre & radius of sphere of form x2+y2+z2+2ux +2vy+2wz+d=0 GO

What is plane?

A plane is a surface such that, if two points are taken on it, a straight line joining them lies wholly in the surface. The coefficient of x, y and z in the cartesian equation of a plane are the direction ratios of normal to the plane.

How to Calculate constant coefficient of plane given ⊥ distance between plane and a point and coordinates of point?

constant coefficient of plane given ⊥ distance between plane and a point and coordinates of point calculator uses constant coefficient of plane= 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)) to calculate the constant coefficient of plane, The constant coefficient of plane given ⊥ distance between plane and a point and coordinates of point formula is defined as is a constant number in the plane of lx + my + nz = p form. constant coefficient of plane and is denoted by p symbol.

How to calculate constant coefficient of plane given ⊥ distance between plane and a point and coordinates of point using this online calculator? To use this online calculator for constant coefficient of plane given ⊥ distance between plane and a point and coordinates of point, enter Perpendicular Distance (d), Direction ratio 1 (d1), x coordinate in 3D space (x), Direction ratio 2 (d2), y coordinate in 3D space (y), Direction ratio 3 (d3) and z coordinate in 3D space (z) and hit the calculate button. Here is how the constant coefficient of plane given ⊥ distance between plane and a point and coordinates of point calculation can be explained with given input values -> 3.93 = modulus((0.03)+(0.7* 2)+(0.2* 5)+(0.5* 3)).

FAQ

What is constant coefficient of plane given ⊥ distance between plane and a point and coordinates of point?
The constant coefficient of plane given ⊥ distance between plane and a point and coordinates of point formula is defined as is a constant number in the plane of lx + my + nz = p form and is represented as p= modulus((d)+(d1* x)+(d2* y)+(d3* z)) or constant coefficient of plane= 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)). The perpendicular distance between two objects is the distance from one to the other, measured along a line that is perpendicular to one or both, Direction ratio 1 is ratio proportional to direction cosine w.r.to x axis, x coordinate in 3D space is defined as the a point on x axis, Direction ratio 2 is ratio proportional to direction cosine w.r.to y axis, y coordinate in 3D space is defined as the a point on y axis, Direction ratio 3 is ratio proportional to direction cosine w.r.to z axis and z coordinate in 3D space is defined as the a point on z axis.
How to calculate constant coefficient of plane given ⊥ distance between plane and a point and coordinates of point?
The constant coefficient of plane given ⊥ distance between plane and a point and coordinates of point formula is defined as is a constant number in the plane of lx + my + nz = p form is calculated using constant coefficient of plane= 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)). To calculate constant coefficient of plane given ⊥ distance between plane and a point and coordinates of point, you need Perpendicular Distance (d), Direction ratio 1 (d1), x coordinate in 3D space (x), Direction ratio 2 (d2), y coordinate in 3D space (y), Direction ratio 3 (d3) and z coordinate in 3D space (z). With our tool, you need to enter the respective value for Perpendicular Distance, Direction ratio 1, x coordinate in 3D space, Direction ratio 2, y coordinate in 3D space, Direction ratio 3 and z 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 constant coefficient of plane?
In this formula, constant coefficient of plane uses Perpendicular Distance, Direction ratio 1, x coordinate in 3D space, Direction ratio 2, y coordinate in 3D space, Direction ratio 3 and z coordinate in 3D space. We can use 2 other way(s) to calculate the same, which is/are as follows -
  • constant coefficient of plane=(constant coefficient of plane2)-((Length)*sqrt((Direction ratio 1)^2+(Direction ratio 2)^2+(Direction ratio 3)^2))
  • constant coefficient of plane=constant coefficient of plane2+(Distance Between Line*((Direction ratio 1^2)+(Direction ratio 2^2)+(Direction ratio 3^2))^0.5)
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