A square has vertices (0, 0), (m, 0), and (0, m). Find the fourth
vertex.

Solve inequality : 3x-2>4-3x and then graph the solution.

Note:
When we have an inequality with the symbols< or > , we use dotted lines to graph them. This is because we do not include the end point of the inequality.

State and prove the Midsegment Theorem.

MN is the midsegment of △ ABC.
Find MN.
Also, find AC if CN = 35 cm

In △ ABC, AM ≅ BM
BQ ≅ QC
Prove that MQ ∥ AC.

NQ, MN and MQ are the midsegments of △ ABC.
Find BM.

MN is the midsegment of △ ABC.
Find MN if BC = 35 m.

MN is the midsegment of △ ABC.
Find BC if MN = 17 cm.

Solve inequality -4x≥20 and then graph the solution.

Solve inequality: and then graph the solution.

Rachel multiplied each side of X≥2 by 3. She wrote the result as 3X≤ 6. Explain the error Rachel made.

Use the information in the diagram. What is the length of side BC of △ ABC ? Explain your reasoning.

 

Given: P(0,h), Q(h,0), R(-h,0)
Prove: △ PQR is an isosceles triangle.

A rectangle with side lengths 3h and k has a vertex at (2h, k). Which point cannot be a vertex of the rectangle?

Use △ ABC, where M, N, Q are midpoints of the sides.
MQ = 3y − 5, AC = 4y + 2

M and N are midpoints of the sides AB and AC respectively.
Which of the given statements is NOT correct?