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Rewrite [tex]\(\sin 35^{\circ}\)[/tex] in terms of the appropriate cofunction.

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To rewrite [tex]\(\sin 35^{\circ}\)[/tex] in terms of the appropriate cofunction, we can utilize a trigonometric identity known as the cofunction identity.

The cofunction identity states that:
[tex]\[ \sin(\theta) = \cos(90^{\circ} - \theta) \][/tex]

Using this identity, we can express [tex]\(\sin 35^{\circ}\)[/tex] in terms of cosine:

1. Start with the given angle in the sine function: [tex]\(\sin 35^{\circ}\)[/tex].
2. According to the cofunction identity, we need to find [tex]\(90^{\circ} - 35^{\circ}\)[/tex].

Subtracting 35 from 90 gives:
[tex]\[ 90^{\circ} - 35^{\circ} = 55^{\circ} \][/tex]

So, [tex]\(\sin 35^{\circ}\)[/tex] is equal to [tex]\(\cos 55^{\circ}\)[/tex].

Therefore, we have:
[tex]\[ \sin 35^{\circ} = \cos 55^{\circ} \][/tex]

This is how [tex]\(\sin 35^{\circ}\)[/tex] can be rewritten in terms of its cofunction.
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