Draw a circle of any radius. Draw each of the following in it:
(a) Radius OA (b) Diameter CD (c) Chord CX.
Answers
Answer:
b
Step-by-step explanation:
is the answer is yes
Answer:
(c) Chord CX
Step-by-step explanation:
Intersecting chords theorem states that when two chords intersect each other inscale a circle, the product of their segments are equal also, diameter is the longest chord of the circle also now, draw a diameter of the circle passing through points P and M. it is the line XY as shown in the attachment
Intersecting chords theorem states that when two chords intersect each other inscale a circle, the product of their segments are equal also, diameter is the longest chord of the circle also now, draw a diameter of the circle passing through points P and M. it is the line XY as shown in the attachmentLength XY=2∗ radius =2∗13=26cm
Intersecting chords theorem states that when two chords intersect each other inscale a circle, the product of their segments are equal also, diameter is the longest chord of the circle also now, draw a diameter of the circle passing through points P and M. it is the line XY as shown in the attachmentLength XY=2∗ radius =2∗13=26cmMY=PY−PM=13−5=7cm
Intersecting chords theorem states that when two chords intersect each other inscale a circle, the product of their segments are equal also, diameter is the longest chord of the circle also now, draw a diameter of the circle passing through points P and M. it is the line XY as shown in the attachmentLength XY=2∗ radius =2∗13=26cmMY=PY−PM=13−5=7cmXM=XP+PM=13+5=18cm
Intersecting chords theorem states that when two chords intersect each other inscale a circle, the product of their segments are equal also, diameter is the longest chord of the circle also now, draw a diameter of the circle passing through points P and M. it is the line XY as shown in the attachmentLength XY=2∗ radius =2∗13=26cmMY=PY−PM=13−5=7cmXM=XP+PM=13+5=18cmBy the intersecting chords theorem we have
Intersecting chords theorem states that when two chords intersect each other inscale a circle, the product of their segments are equal also, diameter is the longest chord of the circle also now, draw a diameter of the circle passing through points P and M. it is the line XY as shown in the attachmentLength XY=2∗ radius =2∗13=26cmMY=PY−PM=13−5=7cmXM=XP+PM=13+5=18cmBy the intersecting chords theorem we have CM∗PM=XM∗YM=18∗7=126
Intersecting chords theorem states that when two chords intersect each other inscale a circle, the product of their segments are equal also, diameter is the longest chord of the circle also now, draw a diameter of the circle passing through points P and M. it is the line XY as shown in the attachmentLength XY=2∗ radius =2∗13=26cmMY=PY−PM=13−5=7cmXM=XP+PM=13+5=18cmBy the intersecting chords theorem we have CM∗PM=XM∗YM=18∗7=126∴CM∗PM=126