To find the locus of points where the difference of the distances from two fixed points (let's call them F1 and F2) is constant, we can follow these steps:1. Define the Fixed Points: Let F1 and F2 be two fixed points in the coo
Give a sketch of the angle and the locus of points. Angle Bisector Theorem If a point is on the bisector of an angle, then it is equidistant from the sides of the angle. Prove: ∵OA=OB∠AOD=∠BOD∠OAD=∠OBD=90∘∴△AOD...
What is the sum of the squares of direction cosines of the line joinin... 01:51 If a line makes the angle alpha,beta,gamma with the axes, then what is... 02:56 What is the locus of points of intersection of a sphere and a plane? 01:44 What is the angle between the planes 2x...
Locus is a set of points that satisfies a set of conditions. Examples of a locus: A circle that represents a set of points which is equidistance from a common point. The distance between a point {eq}(x_1, y_1) {/eq} and a line {eq}ax+by+c=0 {/eq} i...
In geometry, a circle is the locus of points located at the same distance from a given fixed point. The word locus sounds complicated, but it means set of all points on a plane. The fixed point is called center of the circle.Another way then to define a circle is to say that it ...
Therefore, I is the midpoint of segment GH. You could also call the ⟂ bisector the locus of points equidistant from two given points. This makes sense because when you are looking at the red line, you can see that every point on that line is equidistant to G and H. ...
The locus of the pivot point traced during turning is the trajectory of the circle created or tending to be created. You might also like to read Understanding Different Types Of Manoeuvres of a Vessel Understanding Different Types Of Manoeuvres of a Vessel -Part 2 Understanding Heavy Lifting Op...
What is Spinodal curve? The locus of these points (the inflection point within a G-x or G-c curve, Gibbs free energy as a function of composition) is known as the spinodal curve. ... The free energy of mixing changes with temperature and concentration, and the binodal and spinodal meet...
To determine the position of a point with respect to a circle, we can follow these steps:1. Write the Equation of the Circle: The general equation of a circle can be written as: \( x^2 + y^2 + 2gx + 2fy + c = 0 \)
What is the area of the circle x^2 + y^2 = 16? What is the area of a circle with equation x^2 + y^2 - 6x + 8y = 56? Which of the following circles would show the locus of points in a plane 1 unit from the intersection of the lines x + y = 2 \text{ and } x + ...