Math, asked by gurucharan6300, 1 year ago

In a linear transform, when the orientation of space is inverted, the determinant value is negative.

Answers

Answered by rini2k5
0

Answer:

TRUE

Step-by-step explanation:

This statement is true

Answered by gratefuljarette
0

Yes. In a linear transform, when the orientation of space is inverted, the determinant value is negative.

Explanation:

  • Linear Transformation is used extensively in vector space.
  • Orientation place a crucial role in linear transform as the value of the determinant is dependent on it.  
  • Orientation can be determined for both two dimensional and three-dimensional objects. In the case of two dimensional objects, clockwise and anti-clockwise directions of a cycle are determined and in case of three-dimensional objects Left and Right handed properties of a figure could be concluded.
  • To learn more:
  • What is Euclid's geometry?
  • https://brainly.in/question/1142758
  • what is orientation?explain its type ​
  • https://brainly.in/question/11451313
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