If x, y and z are three different numbers, then
prove that:
x2 + y2 + z2 – xy - yz – zx is always positive.
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Step-by-step explanation:
10. x^{2} + y^{2} + z^{2} - xy -yz - xz = \frac{1}{2} (x - y)^{2} + \frac{1}{2} (y - z)^{2} + \frac{1}{2} (z - x)^{2} > 0 because square of number is always positive, and x,y,z are diffrent that means anyone expression is not equal 0.
11. (i) (a + b)(a+b) = a^{2} + ab + ba + b^{2} = a^{2} + 2ab + b^{2} \\\\(ii) (a + b)(a+b)(a+b) = (a^{2} + 2ab + b^{2} )(a+b) = a^{3} + 2a^{2} b + ab^{2} + ba^{2} + 2ab^{2} + b^{3} = \\\\=a^{3} + 3a^{2} b + 3ab^{2} + b^{3} \\\\(iii) (a - b)(a - b)(a - b) = (a + (-b))(a + (-b))(a + (-b)) =\\\\ = a^{3} + 3a^{2}(-b) + 3a(-b)^{2} + (-b)^{3} = a^{3} - 3a^{2} b + 3ab^{2} - b^{3}
5.0
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