1.	has vertices X(-1, 1), Y(3, 9), and Z(6, -2). Determine the coordinates of point W on so that is a median of
		A.	(2, -1)	B.	(2, 4)
		C.	(1, 5)	D.
		Hint
	2.	Marty has a piece of rope with exactly 7 knots tied at equal intervals as shown. Using the rope, he wants to make triangles so that each vertex of the triangle occurs at a knot. How many different triangles can Marty make?
		A.	3	B.	2
		C.	4	D.	1
		Hint
	3.	In which picture is an angle bisector?
		A.		B.
		C.		D.
		Hint
	4.	Name the property that justifies if a < b, then a + c < b + c.
		A.	Transitive Property	B.	Comparison Property
		C.	Subtraction Property	D.	Addition Property
		Hint
	5.	PQR has vertices P(-4, 6), Q(4, 5), R(-2, -3). Which angle has the smallest measure?
		A.	There is not enough information to answer this question.	B.	P
		C.	R	D.	Q
		Hint
	6.	If 15 and 20 are the lengths of two sides of a triangle, between what two numbers must the measure of the third side fall?
		A.	15 and 20	B.	10 and 35
		C.	10 and 25	D.	5 and 35
		Hint
	7.	In the picture shown, and CD > AD. What is the relationship between ABD and CBD?
		A.	mABD = mCBD
		B.	mABD < mCBD
		C.	mABD > mCBD
		D.	ABD CBD
		Hint
	8.	Which statement can be proven using the SSS Inequality Theorem?
		A.	mPDA < mBAC	B.	mBAC < mPDA
		C.	mB > mBCD	D.	CD = AP
		Hint
	9.	State the assumption that could be used to start an indirect proof of the statement Points A, B, C, and O are coplanar.
		A.	Points A, B, C, and O are coplanar.	B.	Points A, B, C, and O are collinear.
		C.	Points A, B, C, and O form a quadrilateral.	D.	Points A, B, C, and O are not coplanar.
		Hint
	10.	State the assumption that could be used to start an indirect proof of the statement AB + BC > DE.
		A.	AB + BCDE	B.	AB + BCDE
		C.	AB + BC = DE	D.	AB + BC < DE
		Hint