Triangle Inequality and Pseudometric

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fabbi007
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Homework Statement


[itex] d(x,y)=(a|x_1-y_1|^2+b|x_1-y_1||x_2-y_2|+c|x_2-y_2|^2)^{1/2}[/itex]

where [itex]a>0, b>0, c>0[/itex] and [itex]4ac-b^2<0[/itex]

Show whether [itex]d(x,y)[/itex] exhibits Triangle inequality?

Homework Equations



(M4) [itex]d(x,y) \leq d(x,z)+d(z,y)[/itex] (for all x,y and z in X)

The Attempt at a Solution



I started my solution by solving by squaring the both sides of the equation.

[itex]d^2(x,y); [d(x,z)+d(z,y)]^2.[/itex] separately

I am tending to think it does not satisfy the triangle inequality any other simple way to prove it? Also is this a pseudometric? if it does not satisfy the triangle inequality?
 
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