Kellis Segment Two Practice Exam- 9.11

When the coordinates (1, 1), (2, 3), (5, 3), and (4, 1) are joined, which shape is formed? -Parallelogram - Rectangle - Rhombus - Square

When the coordinates (1, 1), (4, 4), (7, 1), and (4, −2) are joined, which shape is formed? - Parallelogram - Rectangle - Rhombus - Square

When the coordinates (1, 1), (7, 3), (8, 0), and (2, −2) are joined, which shape is formed? - Parallelogram - rectangle - Rhombus - Square

When the coordinates (2, 3), (4, 4), (6, 3), and (4, 2) are joined, which shape is formed? - Parallelogram - Rectangle - Rhombus - Square

Quadrilateral ABCD has opposite sides that are parallel and side AB congruent to side DC. What classification can be given to ABCD? - Parallelogram - Rectangle - Rhombus - Square

Quadrilateral ABCD has diagonals that are congruent and perpendicular to each other. What classification can be given to ABCD? - Parallelogram - Rectangle - Kite - Square

Quadrilateral ABCD has all congruent sides and opposite angles that are congruent. What classification can be given to ABCD? - Parallelogram - Rectangle - Rhombus - Square

Quadrilateral ABCD has congruent angles and opposite sides that are congruent. What classification can be given to ABCD? - Parallelogram - Rectangle - Rhombus - Square

The slope formula can be used to prove a triangle has? - Congruent Sides - A right angle - Parallel sides - Congruent angles

The distance formula can be used to prove a triangle has? - Congruent Sides - A right angle - Parallel sides - Congruent angles

The slope formula can be used to prove a quadrilateral has? - Congruent sides - Proportional angles - Parallel sides - Congruent angles

The distance formula can be used to prove a quadrilateral has? - A right angle - Congruent angles - Parallel sides - Congruent sides

Line AB contains points A (0, 1) and B (1, 5). The slope of line AB is? - (-4) - (-1/4) - 1/4 - 4

Line AB contains points A (3, −2) and B (1, 8). The slope of line AB is? - (-5) - (-1/5) - 1/5 - 5

Line AB contains points A (−2, 6) and B (4, 5). The slope of line AB is? - (-6) - (-1/6) - 1/6 - 6

Line AB contains points A (8, −4) and B (1, −5). The slope of line AB is - (-7) - (1/7) - 1/7 - 7`

Line AB contains points A (0, 0) and B (2, 2). Line CD contains points C (3, 1) and D (5, 3). Lines AB and CD are? - Parallel - Perpendicular - Neither

Line BC contains points B (4, −5) and C (3, 2). Line DE contains points D (2, 0) and E (9, 1). Lines BC and DE are? - Parallel - Perpendicular - Neither

Line FG contains points F (3, 7) and G (−4, −5). Line HI contains points H (−1, 0) and I (4, 6). Lines FG and HI are? - Parallel - Perpendicular - Neither

Line JK contains points J (4, 3) and K (1, 5). Line LM contains points L (2, 3) and M (−1, 5). Lines JK and LM are? - Parallel - Perpendicular - Neither

The equation of line AB is y = 5x + 1. Write an equation of a line parallel to line AB in slope-intercept form that contains point (4, 5). - y= 5x-15 - y= -5x+15 - y= 1/5x+21/5 - y= 1/5x-29/5

The equation of line CD is y = 3x − 3. Write an equation of a line perpendicular to line CD in slope-intercept form that contains point (3, 1). - y= 3x+0 - y= -3x-8 - y= -1/3x+2 - y= 1/3x+0

The equation of line EF is y = 2x + 1. Write an equation of a line parallel to line EF in slope-intercept form that contains point (0, 2). - y= -2x-4 - y= 2x+2 = y= -1/2x-4 - y= 1/2x+2

The equation of line GH is y = 4x − 3. Write an equation of a line perpendicular to line GH in slope-intercept form that contains point (2, 3). - y= 4x-3 - y= -4x-5 - y= 1/4x-3 - y= -1/4x+7/2

Find the point that splits segment AB in half if point A is located at (4, 3) and point B is located at(−2, 6). - (1, 4.5) - (3, -1.5) - (3.5, 4.5) - (0.5, 2)

Find the point that splits segment EF in half if point E is located at (5, −2) and point F is located at(−1, 3). - (1.5, 1) - (2, 0.5) - (3.5, 4.5) - (3, −2.5)

Find the point that splits segment CD in half if point C is located at (−2, 4) and point D is located at(3, 7). - (2.5, 1.5) - (1. 5) - (0.5, 5.5) - (3, 2)

Find the point that splits segment GH in half if point G is located at (−3, 5) and point H is located at(0, −2). - (1, -1) - (4, 1) - (1.5. 3.5) - (-1.5, 1.5)

Point A is located at (0, 4), and point B is located at (−2, −3). Find the point that is 1/4 the distance from point A to point B. - ( -1, 0.75) - (-0.75, 2) - (-0.5, 2.25) - (-0.25, 3)

Point C is located at (1, 2), and point D is located at (−4, −2). Find the point that is the distance from point C to point D. - (−0.25, 1) - (−1.5, 0) - (−0.5, 1.5) - (0.25, 2.25)

Point E is located at (2, −3), and point F is located at (−2, −1). Find the point that is 3/4 the distance from point E to point F. - (−1, 1.75) - (−2, 0.5) - (0, −2) - (−1, −1.5)

Point G is located at (3, −1), and point H is located at (−2, 3). Find the point that is 2/3 the distance from point G to point H. - (0.33, −1.67) - (−0.33, 1.67) - (−0.5, −1) - (6.33, −2.67)

Find the point C such that AC and BC form a 2:3 ratio. a (-3, 5) b (3, 0) - (−1, 1.2) - (−0.6, 3) - (0, 2.4) - (0.5, 2)

Find the point F such that DF and EF form a 1:3 ratio. d (-3, -3) e (2, 4) - (0.75, 2.25) - (-1, -0.5) - (1, 2) - (-1.75, -1.25)