[b][color=#45818e][u]Move[/u] the [/color][u]black point[/u] [color=#45818e]and [/color][color=#9900ff][u]slider[/u][/color][color=#1e84cc].[br][br][/color][color=#45818e]Observe what happens to the values.[/color][/b]
How are [color=#9900ff]cos(A)[/color] and [color=#ff00ff]sin(B)[/color] related?
How are [color=#9900ff]sin(A)[/color] and [color=#ff00ff]cos(B)[/color] related?
[size=150]Sine and cosine are [b]cofunctions[/b]: functions that are [u]equal[/u][u] when[/u] their [u]inputs are complementary[/u] (sum = 90°).[br][br][img]data:image/png;base64,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[/img][br][br][/size]Knowing this, which of the following would be equivalent to [b]sin(28°)[/b]?