Reduce the quadratic form 10x^2+2y^2+5z^2-4xy-10xz+6yz to canonical form and find its Index, Nature and Signature.
Reduce to normal by orthogonal transformation.
Answers
Answer:
Any equation in the form ax 2 + bx + c = 0 is said to be in quadratic form. This equation then can be solved by using the quadratic formula, by completing the square, or by factoring if it is factorable. Solve x 4 – 13 x 2 + 36 = 0 by (a) factoring and (b) applying the quadratic formula.
Step-by-step explanation:
Step : 1 The most basic version of something. the shape of a square matrix where the major diagonal is the only place where there are no elements. We now know that an equation is said to be a linear equation in two variables x and y if it can be stated in the form ax+by+c=0, where a and b are not both zero, and a, b, and c are real values.
Step : 2 A matrix must first be reduced to echelon form using Gaussian elimination as explained in section 1 before being reduced to row canonical form, also known as row reduced echelon form, "reduced row-echelon" form, or Gauss-Jordan form. By multiplying each non-standard sum term by the sum of its missing variable and complement, two sum terms are produced.
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Step-by-step explanation:
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