结果1 题目 Find the coordinates of the point M(x, y) which is equidistant from each of the points P(4, 3) andQ(3. 2), and is also equidistant from R(6, 1) and S(4. 0). 相关知识点: 试题来源: 解析 (z/1)⋅z/1+i)=w 反馈 收藏 ...
Find the coordinates of the midpoint of the hypotenuse of the right triangle whose vertices are A (1, 1), B (5, 2), and C (4, 6) and show that this point is equidistant of each of the vertices. Consider the three points O, P = (1, 1, 0) , a...
Given points are (5,−2)(5,−2) and (−3,2)(−3,2). To do: We have to find the point on y-axis which is equidistant from (5,−2)(5,−2) and (−3,2)(−3,2). Solution: Let the co-ordinates of the two points be A(5,−2)A(5,−2) and B(...
Find the point on the x-axis that is equidistant from the points (6,-4) and (-2,1)Find the distance the point P(-1, 2, 8), is to the plane through the three points Q(-3, 3, 3), R(-1, 8, 6), and S(1, 4, -1)....
Tangent A tangent is a line that intersects a circle at exactly one point. The point of intersection is called the point of tangency Tangent Example 2 Explain why the wheels on a train are closer to being tangent to the rails than a car tire to the road. ...
在y轴上找到一个距离(8,-8)和(1,1)两点距离相等的点Find a point on the y-axis that is equidistant from the points (8,−8)and (1,1).(x,y) = ( ) 答案 设为(0,a)则(8-0)²+(-8-a)²=(1-0)²+(1-a²)64+64+16a+a²=1+1-2a+a²a=-7所以是(0,-7)相关推荐...
A circle is a round shape with no corners or edges. Each point along a circle is equidistant from the center. It’s important to note that a circle is a two dimensional shape, but it is not a polygon because it does not have straight sides. ...
find the \angle between the normals of intersecting surfaces of (x-2)^2+2y^2+z^2=3 and 2(x-2)^2+y^2+2(z-1)^2=5, , at (2+\sqrt 39/4,1/4,3/4) Find the point on the x-axis that is equidistant from the points...
The centroid is a point in the figure at which the whole mass of the figure gets balanced. The coordinates of centroid are given by ⟨x¯,y¯⟩ : x¯=∫xds∫ds,y¯=∫yds∫ds;ds=(dxdt)2+(dydt)2dt Answer and Explanation: 1 ...
A, B, and C are collinear points: B is between A and C. If AB = 3x + 4, BC = 4x - 1, and AC = 6x + 5, find AC. If the point (a, 4) is equidistant from the points A(5, -2) and B(3, 4), find a. The lines i...