![]() ![]() Find the terminal point on the unit circle determined by 3/4 radians. So a terminal at different points on the circle gives the value of sine and cosine functions at that point. This will be studied in the next exercise. Find the terminal point on the unit circle determined by 3/4 radians. Use exact values, not decimal approximations. ![]() Question: Find the terminal point on the unit circle determined by 5 pi/4 radians. ![]() ![]() It demonstrates all the radians and circles. This problem has been solved Youll get a detailed solution from a subject matter expert that helps you learn core concepts. Since the circumference of the unit circle is \(2\pi\), it is not surprising that fractional parts of \(\pi\) and the integer multiples of these fractional parts of \(\pi\) can be located on the unit circle. A unit circle chart shows the position of all the points along the unit circle that are made when we divide the circle into eight and twelve parts. The unit circle is divided into four main terminals, that are for 90\circ, 180\circ, 270\circ, 360\circ 90,180,270,360, which are also used to express the phases of the functional waves. \right)\).\) are wrapped to either to the point \((0, 1)\) or \((0, -1)\). The unit circle is the circle (a constant distance tracked around any point) which has the radius as 1 unit. ![]()
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