Tuesday, June 9, 2020
New SAT Math Circle Arc Length
The fourth category of New SAT Math problems ââ¬â Additional Topics in Math ââ¬â doesnt sound too frightening, but dont let the generic name fool you. Many of the problems that show up on the test combine skills you may have learned from multiple math classes throughout middle and high school. Circle arc length, for example, combines geometry along with some basic trigonometry skills. New SAT Math: Basic Circle Skills Review If youre a little shaky or foggy on your knowledge of circle concepts, check this section out. Its a great refresher on what youve probably already learned before during one of your math classes. If you already have a strong grasp on this, go ahead and skip to the next section! Value of Pi The value of pi is about 3.1 diameters to equal the circumference of a circle. Degrees in a Circle A circle consists of 360 degrees. Half of the circle is 180 degrees, and a quarter of a circle is 90 degrees. Radians Radians are an angle measure equivalent to an arc length of one radius of a circle. It is a relative measurement. 1 radian equals about 57.3 degrees. Remember to check your calculator settings carefully to make sure it is set properly for either degrees or radians. You can bet that test makers will throw in a trap answer here or there for unsuspecting students. New SAT Math: Arc Length of a Circle Now that youve thoroughly brushed up on the basics of circles, lets get right into figuring out how to calculate the arc length of a circle. The new SAT contains problems that really dig deep into seeing how well you understand basic concepts, so take extra care to know the fundamentals forwards and backwards. Circle Arc Length The total circle arc length is the circumference, or the perimeter of a circle. When we want to find out the length of a small part of that circumference, we need to multiply it by a fraction between 0 and 1. We can use either degrees or radians in order to represent this fraction. An entire circle equals 360 degrees or 2pi radians, so our formula looks like this: Circle Arc Length = circumference * (x degrees / 360) OR Circle Arc Length = circumference * (x radians / 2pi) Looking for more help with circles on the SAT? Check out our videos about unit circle basics and tangents to a circle.
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