What we need here to answer this problem is to see the translation with respect to the angle C to the angle A.
The adjacent leg/hypotenuse of angle A is defined in the triangle as
[tex]\frac{adjacent}{hyp}A=\frac{AB}{AC}[/tex]
And base on angle C, this is the same as the opposite/hypotenuse of angle C wherein
[tex]\frac{opposite}{hyp}C=\frac{AB}{AC}[/tex]
Therefore, the adjacent leg/hypotenuse of angle A is equal to 0.26.
The opposite/hypotenuse of angle A based on the figure is
[tex]\frac{opposite}{hypotenuse}A=\frac{BC}{AC}[/tex]
And base on angle C, this is the same as the adjacent/hypotenuse of angle C wherein
[tex]\frac{adjacent}{hyp}C=\frac{BC}{AC}[/tex]
Therefore, the opposite/hypotenuse of angle A is equal to 0.97.
The opposite/adjacent of the angle A can be determined by just dividing the opposite/hypotenuse by the adjacent/hypotenuse. We have
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