A. Do as directed. Use a ruler and protractor. Given: AB at the right,
1-2 Draw another AC perpendicular to AB at Point A.
3-4. Draw another CD perpendicular to AC at Point C.
5-6. Is AB | CD Justify your answer.
Nasa pic po ang drawing na given
NONSENSE=REPORT!
Answers & Comments
ANSWER✏
Draw a pair of parallel lines, AB and DE, which are 7 cm apart.
Draw a pair of parallel lines, AB and DE, which are 7 cm apart.Make the length of AB = 5 cm and the length of DE 15 cm.
Draw a pair of parallel lines, AB and DE, which are 7 cm apart.Make the length of AB = 5 cm and the length of DE 15 cm.Join the end-points of these lines so they cross over and intersect at point C.
Draw a pair of parallel lines, AB and DE, which are 7 cm apart.Make the length of AB = 5 cm and the length of DE 15 cm.Join the end-points of these lines so they cross over and intersect at point C.You now have two triangles with vertices ABC and CDE.
Draw a pair of parallel lines, AB and DE, which are 7 cm apart.Make the length of AB = 5 cm and the length of DE 15 cm.Join the end-points of these lines so they cross over and intersect at point C.You now have two triangles with vertices ABC and CDE.Prove these two triangles are similar by considering the angles of each triangle.
Draw a pair of parallel lines, AB and DE, which are 7 cm apart.Make the length of AB = 5 cm and the length of DE 15 cm.Join the end-points of these lines so they cross over and intersect at point C.You now have two triangles with vertices ABC and CDE.Prove these two triangles are similar by considering the angles of each triangle.We know the ratio of the sides AB and DE.
Draw a pair of parallel lines, AB and DE, which are 7 cm apart.Make the length of AB = 5 cm and the length of DE 15 cm.Join the end-points of these lines so they cross over and intersect at point C.You now have two triangles with vertices ABC and CDE.Prove these two triangles are similar by considering the angles of each triangle.We know the ratio of the sides AB and DE.Check by measuring which other pairs of sides are in the same ratio.
EXPLANATION✒
Construct a triangle PQR with measurements of:
Construct a triangle PQR with measurements of:PQ = 9 cm
Construct a triangle PQR with measurements of:PQ = 9 cmPR = 13 cm
Construct a triangle PQR with measurements of:PQ = 9 cmPR = 13 cmQR = 7 cm
Construct a triangle PQR with measurements of:PQ = 9 cmPR = 13 cmQR = 7 cmDraw a line ST that is parallel to line QR so that point T is on the line PR.
Construct a triangle PQR with measurements of:PQ = 9 cmPR = 13 cmQR = 7 cmDraw a line ST that is parallel to line QR so that point T is on the line PR.7 cm
Construct a triangle PQR with measurements of:PQ = 9 cmPR = 13 cmQR = 7 cmDraw a line ST that is parallel to line QR so that point T is on the line PR.7 cm9cm
Construct a triangle PQR with measurements of:PQ = 9 cmPR = 13 cmQR = 7 cmDraw a line ST that is parallel to line QR so that point T is on the line PR.7 cm9cmS
Construct a triangle PQR with measurements of:PQ = 9 cmPR = 13 cmQR = 7 cmDraw a line ST that is parallel to line QR so that point T is on the line PR.7 cm9cmST
Construct a triangle PQR with measurements of:PQ = 9 cmPR = 13 cmQR = 7 cmDraw a line ST that is parallel to line QR so that point T is on the line PR.7 cm9cmSTExplain why triangles PQR and PTS are similar.
Construct a triangle PQR with measurements of:PQ = 9 cmPR = 13 cmQR = 7 cmDraw a line ST that is parallel to line QR so that point T is on the line PR.7 cm9cmSTExplain why triangles PQR and PTS are similar.R 20
Construct a triangle PQR with measurements of:PQ = 9 cmPR = 13 cmQR = 7 cmDraw a line ST that is parallel to line QR so that point T is on the line PR.7 cm9cmSTExplain why triangles PQR and PTS are similar.R 20What is the ratio of the sides PQ to PR?
Construct a triangle PQR with measurements of:PQ = 9 cmPR = 13 cmQR = 7 cmDraw a line ST that is parallel to line QR so that point T is on the line PR.7 cm9cmSTExplain why triangles PQR and PTS are similar.R 20What is the ratio of the sides PQ to PR?13 cm
Construct a triangle PQR with measurements of:PQ = 9 cmPR = 13 cmQR = 7 cmDraw a line ST that is parallel to line QR so that point T is on the line PR.7 cm9cmSTExplain why triangles PQR and PTS are similar.R 20What is the ratio of the sides PQ to PR?13 cmCheck by measuring, to the nearest millimetre, that sides PS and PT are in the same ratio.
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