Show if the functions are linearly independent
$x(t)=3$, $y(t)=3\sin^2t$, $z(t)= 4\cos^2t$
How can i show this?
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Can you write out what you need to prove? – Git Gud Jul 02 '14 at 00:56
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A related problem. – Mhenni Benghorbal Jul 02 '14 at 01:37
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$x(t) - y(t) - \frac{3}{4} z(t) = 0$ for all $t$, so they are not linearly independent.
Hans Engler
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Hint: Knowing that $\sin^2t+\cos^2t=1$, it is obvious that $4y+3z=12$. Now multiply x with $-4$, and add it to the previous sum.
Lucian
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