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The Angle that Isometric Lines Make with Each Other is
By BYJU'S Exam Prep
Updated on: September 13th, 2023
In technical and engineering drawings, isometric projection is a technique for rendering three-dimensional objects in two dimensions. The three coordinate axes seem equally foreshortened in this axonometric projection, and there is a 120 degree angle between any two of them.
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Answer – The Angle that Isometric Lines Make with Each Other is 120 degrees.
The word isometric is derived from the Greek for equal measure, indicating that the projection’s scale is the same along each of its axes (unlike some other forms of graphical projection). By setting the viewing direction so that the angles between the projections of the x, y, and z axes are all the same, or 120°, an isometric image of an object can be generated.
Consider the perspective within a cubical room, starting in one upper corner and aiming for the opposite, lower corner, to further understand isometric projection. The z-axis is straight up, the x-axis extends diagonally down and right, and the y-axis extends diagonally down and left. The image’s height also reveals depth. The angles between the lines drawn along the axis are 120 degrees.
Summary:
The Angle that Isometric Lines Make with Each Other is
The angle that isometric lines make with each other is 120 degrees. An isometric image of an object can be created by orienting the viewing direction so that the angles between the projections of the x, y, and z axes are all equal, or 120°.
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