Double the result from Step 3 to calculate the length of the chord. Finishing this example, you would multiply 2.9583 by 2 to find the chord's length equals about 5.9166. Radius and Distance to Center Step 1 Square the radius. In this example, the radius will be 10 so you would get 1...
百度试题 结果1 题目 Calculate the length of the chord of the circle with radius r = 10 cm, length of which is equal to the distance from the center of the circle. 相关知识点: 试题来源: 解析 x=8.9443cm 反馈 收藏
Radius: Specifies the radius of the curve. This option is not adjustable if Radius is specified as the Fixed Property. Tangent Distance: Specifies the tangent length of the curve. Arc Distance: Specifies the arc length of the curve. Chord Distance: Specifies the chord length of the curve...
To find the length of the chord of the circle that is at a distance of 12 cm from the center, with a radius of 13 cm, we can follow these steps:1. Identify the Given Information: - Distance from the center to the chord (perp
Circle M alongside has a radius of 10 cm, chord KL=10 cm and KP=PL.Calculate the length of MP. Leave your answer in the simplest surd form, if necessary. 相关知识点: 试题来源: 解析 Hence, The measure of MP is 8.66. MP=√ ((MK^2-KP^2))=√ ((10^2-5^2))=8.66Hence, T...
To solve the problem of finding the distance from the center of the circle to the chord, we can follow these steps:Step 1: Understand the Geometry We have a circle with a radius of 5 cm and a chord of length 6 cm. The center of
whereφis latitude,λis longitude,Ris earth’s radius (mean radius = 6,371km); note that angles need to be in radians to pass to trig functions! JavaScript: var R = 6371e3; // metres var φ1 = lat1.toRadians(); var φ2 = lat2.toRadians(); var Δφ = (lat2-lat1).toRadians...
If we can find the radius R of the bolt circle, then this gives us the diameter D. We calculated that: θ = 360 / N Also, A is the spacing between holes. D is the bolt circle diameter. Referencing the diagram above, a triangle can be drawn between the two ends of an arc on th...
X is a point 7 cm from the center of circle O with a radius of 9 cm. AXB is a chord of the circle such that AX= 2 XB. Find the length of AB. If the area of a circle is 201.06 cm, find its diameter and circumference. ...
Both the arc length and the area of a sector are functions of the radius and the measure of central angle in radians. Hence, if the radius and the measure of central angle are known or given, the arc length as well as the area of the sector can be found. An...