Find the equation of the line passes through the point (2,3) and the point of
intersection of the line 3𝑥 + 2𝑦 = 2 and 4𝑥 + 3𝑦 = 7 meet.
1) The angles of a pentagon are, x°, (x+20)°, (x-15)°, 2x°, (3x/2+30)°. Find x.
Q is the midpoint of segment PR. What are PQ, QR and PR?
PQ = 6x - 7
QR = 5x + 1
THE PERIMETER OF AN EQUILATERAL TRIANGLE IS 12CM
A= WHAT IS THE LENGTH OF EACH SIDE OF THE TRIANGLE
B= WHAT IS THE SIZE OF EACH ANGLE OF THE TRIANGLE
Transform the equation x2+3xy+y2-2x+2y-1=0 to rectangular axes through the point (-1,1) and inclined at an angle 45 degree
Point Q is on line segment \overline{PR}
PR
. Given QR=2x+4,
QR=2x+4, PQ=x,
PQ=x, and PR=4x-10,
PR=4x−10, determine the numerical length of \overline{PR}.
PR
.
XY=11d,YZ=9d-2,XZ=5d+28
AB bisects CD at E. If CE = 2 1/4 in., find CD