Two points P and Q are given. P(2, 1, 0), Q(−1, 2, −3) (a) Find the distance between P and Q.
For the points P(3.4) and Q(3,5), find (a) the distance between P and Q and (b) the coordinates of the midpoint of the segment PO. (a) The distance between P and Q is, d(P,Q) = (Simplify your answer. Type an exact answer, using radicals as needed.) (b) The midpoint of the segment PQ is (Simplify your answer. Type an ordered pair. Type an exact answer for each coordinate, using radicals as needed.)
If P (3, 1) and Q (-3, -7), find The distance PQ Enter
If P (3, 1) and Q (-3, -7), find The distance PQ Enter
Find the Euclidean distance between the points and the city distance between the points. Assume that both de(P, Q) and d (P, Q) are measured in blocks. P(4,-1), Q(8, -1) d(P, Q) d(P, Q) blocks blocks
Let S denote the sphere x2 y2 2 = 1. Given two points P(1,0,0), (a) Find the distance between P and Q. Lets call this Euclidean distance. (b) Find the plane that goes through O, P, Q. What is the intersection of this plane with the sphere? (Hint: use OP × OQ as the the normal vector) (c) Observe that the length of the arc PQ is 0 the angle between OP,0Q in radians. (Hint: You know how to find...
Find the distance between (2, -4) and (1,-6). Give the exact distance. midpoint of the line segment that joins points P(2,3) and Q(-2,5).
Use d = proj QP to find the distance between point P(5, 3, – 4) and the plane given by QRXOS 6x+2y- z-5=0.
2. Are the following valid distance functions between pixel p [pz, ^^] and pixel q [q, qyl. Prove your answers D(p, q) — р. + qr + Py + qy D(p, q) pr r + Py.qy D(p, q) 3D Р-Ру + qr-4y
2. Are the following valid distance functions between pixel p [pz, ^^] and pixel q [q, qyl. Prove your answers D(p, q) — р. + qr + Py + qy D(p, q) pr r + Py.qy D(p, q)...
1: Find the force between two charges q, = 411C and -6uC. The distance between charges is 3 centimeters Here 1uC 10 C). Find the number of electrons contained in q
s points) Given the two points P2,4) and Qu,-5) (a) Find the distance between P and Q (b) Find the midpoint of the segment joining P and Q. (c) Find the slope of the line through P and Q. (d) Determine an equation of the line through P and Q (e) Find an equation of a line perpendicular to the line in part (d) through (5,7). (f) Find the equation of a horizontal line through P.