Shweta Patil
Walchand College of Engineering (WCE), Sangli
Shweta Patil has created this Calculator and 500+ more calculators!
Nishan Poojary
Shri Madhwa Vadiraja Institute of Technology and Management (SMVITM), Udupi
Nishan Poojary has verified this Calculator and 300+ more calculators!

11 Other formulas that you can solve using the same Inputs

Volume of a triangular prism when two angles and a side between them are given
Volume=Length*Side A^2*sin(Angle A)*sin(Angle B)/(2*sin(Angle A+Angle B)) GO
Current Value for Alternating Current
Electric Current=Peak Current*sin(Angular Frequency*Time+Angle A) GO
Side a of a triangle
Side A=sqrt((Side B)^2+(Side C)^2-2*Side B*Side C*cos(Angle A)) GO
Fourth angle of quadrilateral when three angles are given
Angle Between Sides=360-(Angle A+Angle B+Angle C) GO
Third angle of a triangle when two angles are given
Angle Between Sides=180-(Angle A+Angle B) GO
Side a of a triangle given side b, angles A and B
Side A=(Side B*sin(Angle A))/sin(Angle B) GO
Peak to Valley Height
Height=Feed/(tan(Angle A)+cot(Angle B)) GO
Work
Work =Force*Displacement*cos(Angle A) GO
Chord Length when radius and angle are given
Chord Length=sin(Angle A/2)*2*Radius GO
Arc Length
Arc Length=2*pi*Radius*(Angle A/360) GO
sin2A given angle A
Sin2A=2*sin(Angle A)*cos(Angle A) GO

8 Other formulas that calculate the same Output

Direction cosine of plane1 w.r.to z axis given plane1 and plane2 are ⊥ to each other
Direction cosine with respect to z axis=-((Direction cosine with respect to x axis*Direction cosine 2 with respect to x axis)-(Direction cosine with respect to y axis*Direction cosine 2 with respect to y axis))/(Direction cosine 2 with respect to z axis) GO
direction cosine w.r.to z axis given direction cosines w.r.to x & y axis and ⊥ distance
Direction cosine with respect to z axis= ((Perpendicular Distance)-( Direction cosine with respect to x axis* x coordinate in 3D space)-(Direction cosine with respect to y axis* y coordinate in 3D space))/(z coordinate in 3D space) GO
Direction cosine of plane1 w.r.to z axis given plane1 & 2 are || & direction cosines w.r.to x axis
Direction cosine with respect to z axis= ((Direction cosine with respect to x axis)/( Direction cosine 2 with respect to x axis))*( Direction cosine 2 with respect to z axis) GO
Direction cosine of plane1 w.r.to z axis given plane1 & 2 are || & direction cosines w.r.to y axis
Direction cosine with respect to z axis= ((Direction cosine with respect to y axis)/( Direction cosine 2 with respect to y axis))*( Direction cosine 2 with respect to z axis) GO
Direction cosine w.r.to z axis given direction cosine w.r.to x and y axis
Direction cosine with respect to z axis= sqrt(1-(Direction cosine with respect to x axis)^2- (Direction cosine with respect to y axis)^2) 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 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
direction cosine w.r.to z axis given ⊥ distance from the origin to the plane
Direction cosine with respect to z axis=(z1 coordinate in 3D space)/(Perpendicular Distance) GO

Direction cosine of line1 w.r.to z axis given angle between line 1 & 2 Formula

Direction cosine with respect to z axis= cos(Angle A)-(Direction cosine with respect to x axis*Direction cosine 2 with respect to x axis)-(Direction cosine with respect to y axis*Direction cosine 2 with respect to y axis)/(Direction cosine 2 with respect to z axis)
n= cos(∠A)-(l*l2)-(m*m2)/(n2)
More formulas
Direction cosine of a line w.r.to y axis GO
Direction cosine of a line w.r.to z axis GO
Direction cosine of a line w.r.to x-axis GO
Direction cosine w.r.to z axis given direction cosine w.r.to x and y axis GO
Direction cosine w.r.to y axis given direction cosine w.r.to x and z axis GO
Direction cosine w.r.to x axis given direction cosine w.r.to y and z axis GO
Direction cosine w.r.to x axis given direction ratio 1,2 & 3 GO
Direction cosine w.r.to y axis given direction ratio 1,2 & 3 GO
Direction cosine w.r.to z axis given direction ratio 1,2 & 3 GO
Direction cosine of line2 w.r.to x axis given angle between line 1 & 2 GO
Direction cosine of line1 w.r.to x axis given angle between line 1 & 2 GO
Direction cosine of line2 w.r.to z axis given angle between line 1 & 2 GO
Direction cosine of line2 w.r.to y axis given angle between line 1 & 2 GO
Direction cosine of line1 w.r.to y axis given angle between line 1 & 2 GO
direction cosine w.r.to z axis given ⊥ distance from the origin to the plane GO
direction cosine w.r.to y axis given ⊥ distance from the origin to the plane GO
direction cosine w.r.to x axis given ⊥ distance from the origin to the plane GO
direction cosine w.r.to x axis given direction cosines w.r.to y & z axis and ⊥ distance GO
direction cosine w.r.to y axis given direction cosines w.r.to x & z axis and ⊥ distance GO
direction cosine w.r.to z axis given direction cosines w.r.to x & y axis and ⊥ distance GO
Direction cosine of plane1 w.r.to x axis given plane1 and plane2 are ⊥ to each other GO
Direction cosine of plane2 w.r.to x axis given plane1 and plane2 are ⊥ to each other GO
Direction cosine of plane1 w.r.to y axis given plane1 and plane2 are ⊥ to each other GO
Direction cosine of plane2 w.r.to y axis given plane1 and plane2 are ⊥ to each other GO
Direction cosine of plane1 w.r.to z axis given plane1 and plane2 are ⊥ to each other GO
Direction cosine of plane2 w.r.to z axis given plane1 and plane2 are ⊥ to each other GO
Direction cosine of plane1 w.r.to x axis given plane1 & 2 are || & direction cosines w.r.to y axis GO
Direction cosine of plane2 w.r.to x axis given plane1 & 2 are || & direction cosines w.r.to y axis GO
Direction cosine of plane1 w.r.to x axis given plane1 & 2 are || & direction cosines w.r.to z axis GO
Direction cosine of plane2 w.r.to x axis given plane1 & 2 are || & direction cosines w.r.to z axis GO
Direction cosine of plane1 w.r.to y axis given plane1 & 2 are || & direction cosines w.r.to x axis GO
Direction cosine of plane2 w.r.to y axis given plane1 & 2 are || & direction cosines w.r.to x axis GO
Direction cosine of plane1 w.r.to y axis given plane1 & 2 are || & direction cosines w.r.to z axis GO
Direction cosine of plane2 w.r.to y axis given plane1 & 2 are || & direction cosines w.r.to z axis GO
Direction cosine of plane1 w.r.to z axis given plane1 & 2 are || & direction cosines w.r.to x axis GO
Direction cosine of plane2 w.r.to z axis given plane1 & 2 are || & direction cosines w.r.to x axis GO
Direction cosine of plane1 w.r.to z axis given plane1 & 2 are || & direction cosines w.r.to y axis GO
Direction cosine of plane2 w.r.to z axis given plane1 & 2 are || & direction cosines w.r.to y axis 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 Direction cosine of line1 w.r.to z axis given angle between line 1 & 2?

Direction cosine of line1 w.r.to z axis given angle between line 1 & 2 calculator uses Direction cosine with respect to z axis= cos(Angle A)-(Direction cosine with respect to x axis*Direction cosine 2 with respect to x axis)-(Direction cosine with respect to y axis*Direction cosine 2 with respect to y axis)/(Direction cosine 2 with respect to z axis) to calculate the Direction cosine with respect to z axis, Direction cosine of line1 w.r.to z axis given angle between line 1 & 2 is defined as cosine of angle formed by line 1 with z axis and other line. Direction cosine with respect to z axis and is denoted by n symbol.

How to calculate Direction cosine of line1 w.r.to z axis given angle between line 1 & 2 using this online calculator? To use this online calculator for Direction cosine of line1 w.r.to z axis given angle between line 1 & 2, enter Angle A (∠A), Direction cosine with respect to x axis (l), Direction cosine 2 with respect to x axis (l2), Direction cosine with respect to y axis (m), Direction cosine 2 with respect to y axis (m2) and Direction cosine 2 with respect to z axis (n2) and hit the calculate button. Here is how the Direction cosine of line1 w.r.to z axis given angle between line 1 & 2 calculation can be explained with given input values -> -1.233975 = cos(0.5235987755982)-(1*0.1)-(1*0.2)/(0.1).

FAQ

What is Direction cosine of line1 w.r.to z axis given angle between line 1 & 2?
Direction cosine of line1 w.r.to z axis given angle between line 1 & 2 is defined as cosine of angle formed by line 1 with z axis and other line and is represented as n= cos(∠A)-(l*l2)-(m*m2)/(n2) or Direction cosine with respect to z axis= cos(Angle A)-(Direction cosine with respect to x axis*Direction cosine 2 with respect to x axis)-(Direction cosine with respect to y axis*Direction cosine 2 with respect to y axis)/(Direction cosine 2 with respect to z axis). The angle A is one of the angles of a triangle, Direction cosine with respect to x axis is the cosine of angle made by a line w.r.to x axis, Direction cosine 2 with respect to x axis is the cosine of angle made by a line w.r.to x axis, Direction cosine with respect to y axis is the cosine of angle made by a line w.r.to y axis, Direction cosine 2 with respect to y axis is the cosine of angle made by a line w.r.to y axis and Direction cosine 2 with respect to z axis is the cosine of angle made by a line w.r.to z axis.
How to calculate Direction cosine of line1 w.r.to z axis given angle between line 1 & 2?
Direction cosine of line1 w.r.to z axis given angle between line 1 & 2 is defined as cosine of angle formed by line 1 with z axis and other line is calculated using Direction cosine with respect to z axis= cos(Angle A)-(Direction cosine with respect to x axis*Direction cosine 2 with respect to x axis)-(Direction cosine with respect to y axis*Direction cosine 2 with respect to y axis)/(Direction cosine 2 with respect to z axis). To calculate Direction cosine of line1 w.r.to z axis given angle between line 1 & 2, you need Angle A (∠A), Direction cosine with respect to x axis (l), Direction cosine 2 with respect to x axis (l2), Direction cosine with respect to y axis (m), Direction cosine 2 with respect to y axis (m2) and Direction cosine 2 with respect to z axis (n2). With our tool, you need to enter the respective value for Angle A, Direction cosine with respect to x axis, Direction cosine 2 with respect to x axis, Direction cosine with respect to y axis, Direction cosine 2 with respect to y axis and Direction cosine 2 with respect to z axis 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 Direction cosine with respect to z axis?
In this formula, Direction cosine with respect to z axis uses Angle A, Direction cosine with respect to x axis, Direction cosine 2 with respect to x axis, Direction cosine with respect to y axis, Direction cosine 2 with respect to y axis and Direction cosine 2 with respect to z axis. We can use 8 other way(s) to calculate the same, which is/are as follows -
  • Direction cosine with respect to z axis= sqrt(1-(Direction cosine with respect to x axis)^2- (Direction cosine with respect to y axis)^2)
  • Direction cosine with respect to z axis= (Direction ratio 1)/sqrt((Direction ratio 1)^2+(Direction ratio 2)^2+(Direction ratio 3)^2)
  • Direction cosine with respect to z axis= (Direction ratio 3)/sqrt((Direction ratio 1)^2+(Direction ratio 2)^2+(Direction ratio 3)^2)
  • Direction cosine with respect to z axis=(z1 coordinate in 3D space)/(Perpendicular Distance)
  • Direction cosine with respect to z axis= ((Perpendicular Distance)-( Direction cosine with respect to x axis* x coordinate in 3D space)-(Direction cosine with respect to y axis* y coordinate in 3D space))/(z coordinate in 3D space)
  • Direction cosine with respect to z axis=-((Direction cosine with respect to x axis*Direction cosine 2 with respect to x axis)-(Direction cosine with respect to y axis*Direction cosine 2 with respect to y axis))/(Direction cosine 2 with respect to z axis)
  • Direction cosine with respect to z axis= ((Direction cosine with respect to x axis)/( Direction cosine 2 with respect to x axis))*( Direction cosine 2 with respect to z axis)
  • Direction cosine with respect to z axis= ((Direction cosine with respect to y axis)/( Direction cosine 2 with respect to y axis))*( Direction cosine 2 with respect to z axis)
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