A map of an amusement park is shown on the coordinate plane with the approximate location of several rides.
coordinate plane with points at negative 14 comma 1 labeled Woozy Wheel, negative 6 comma 2 labeled Bumper Boats, negative 2 comma negative 4 labeled Roller Rail, negative 2 comma negative 6 labeled Trolley Train, 2 comma negative 3 labeled Silly Slide, and 6 comma 11 labeled Parachute Plunge
Determine the distance between the Bumper Boats and the Parachute Plunge.
15 units
225 units
8 units
63 units
Question 2(Multiple Choice Worth 2 points)
(Pythagorean Theorem and the Coordinate Plane MC)
Determine the distance between the points (−2, −4) and (−7, −12).
square root of 337 units
square root of 109 units
square root of 89 units
square root of 13 units
Question 3(Multiple Choice Worth 2 points)
(Pythagorean Theorem and the Coordinate Plane MC)
Determine the length of the line segment shown.
graph of line segment from negative 6 comma negative 5 to 0 comma 3
100 units
25 units
10 units
8 units
Question 4(Multiple Choice Worth 2 points)
(Pythagorean Theorem and the Coordinate Plane LC)
Which graph could be used to find the distance between the points (−9, −11) and (13, 3)?
graph of a right triangle with hypotenuse beginning at negative 13 comma negative 3 and ending at 9 comma 11
graph of a right triangle with hypotenuse beginning at negative 3 comma negative 13 and ending at 11 comma 9
graph of a right triangle with hypotenuse beginning at negative 11 comma negative 9 and ending at 3 comma 13
graph of a right triangle with hypotenuse beginning at negative 9 comma negative 11 and ending at 13 comma 3
Question 5(Multiple Choice Worth 2 points)
(Pythagorean Theorem and the Coordinate Plane MC)
Runners at a cross-country meet run 6 miles east and then 2 miles south from the starting line. Determine the shortest straight path they must run to get back to the starting line.
square root of 40 miles
square root of 32 miles
square root of 8 miles
8 miles
Question 6 (Essay Worth 4 points)
(Pythagorean Theorem and the Coordinate Plane HC)
A map of an obstacle course is shown in the graph. The running path for the course is shaped like a right triangle where each unit is equal to 1 meter.
graph of a right triangle with points at negative 4 comma 0 labeled Obstacle 1, negative 4 comma 3 labeled Starting Point, and 0 comma 0 labeled Obstacle 2
Part A: Find the distance in meters from the starting point to obstacle 2. Show every step of your work. (3 points)
Part B: How many meters is one full lap around the course? Show every step of your work. (1 point)