VOLUMES, SURFACE AREA, & review of y=mx+b Jeopardy Template

VOLUME of CONES

VOLUME of CYLINDERs

VOLUME of SPHERES

SURFACE AREA of CYLINDERs

y = mx + b

100

The cone has a diameter of 12.5 cm.

The height is 21 cm.

WRITE the correct EQUATION to solve for the cone's volume.

V = 1/3 pi (6.25)^2 (21)

100

The Cylinder has a diameter of 12.5 cm.

The height is 21 cm.

WRITE the correct EQUATION to solve for the Cylinder's volume.

V = pi (6.25)^2 (21)

100

Write the equation and Solve for the volume of Sphere with a diameter of 16.5 meters.

(Round your answer to the nearest tenths.)

V = 4/3 pi (8.25)^3

V = 2,352.1 sq. m.

100

The cylinder has a height of 11.75 inches and a radius of 5 inches.

WRITE the EQUATION that will help solve for the LATERAL surface area of the cylinder.

L.S.A. = 2pi (5) (11.75)

100

Solve for the y-intercept,b, of a line that passes through a point (2, -5) with a slope of 3.

b = -11

200

The building shaped like cone has a diameter of 43 meters.

The height is 500 meters.

WRITE the correct EQUATION to solve for the cone's volume.

V = 1/3 pi (21.5)^2 (500)

200

The building shaped like CYLINDER has a diameter of 43 meters.

The height is 500 meters.

SOLVE for the volume of the cylinder.

(Round your answer to the nearest tenths.)

V = 726,100.6 sq. m.

200

Write the equation and Solve for the volume of Sphere with a radius of 20.5 meters.

(Round your answer to the nearest tenths.)

V = 4/3 pi (20.5)^3

V = 36,087.

200

The cylinder has a height of 11.75 inches and a radius of 5 inches.

WRITE the EQUATION that will help solve for the TOTAL surface area of the cylinder.

L.S.A. = 2pi (5) (11.75) + 2pi (5)^2

200

Solve for the y-intercept,b, of a line that passes through a point (-7, -5) with a slope of 4.

b = 23

300

The toy shaped like cone has a radius of 12.625 inches.

The height is 10.8 inches.

WRITE the correct EQUATION to solve for the building's volume. Then SOLVE it!

(Round your answer to the nearest tenths.)

V = 1/3 pi (12.625)^2 (10.8)

V = 1,802.7 sq. inches

300

The toy shaped like CYLINDER has a diameter of 12.625 inches.

The height is 15.8 inches.

WRITE the correct EQUATION to solve for the toy's volume. Then SOLVE it!

(Round your answer to the nearest hundredths.)

V = pi (6.3125)^2 (15.8)

V = 1,977.92 sq. in.

300

Write the equation and Solve for the volume of Sphere with a diameter of 7.15 meters.

(Round your answer to the nearest tenths.)

V = 4/3 pi (3.575)^3

V = 191.4 sq. m.

300

The cylinder has a height of 11.75 inches and a diameter of 8 inches.

WRITE the EQUATION that will help solve for the LATERAL surface area of the cylinder AND SOLVE it!

(Round your final answer to the nearest hundredths.)

L.S.A. = 2pi (4) (11.75)

L.S.A. = 295.31 sq. in.

300

Solve for the y-intercept,b, of a line that passes through a point (4, 9) with a slope of 0.5.

b = 7

400

The toy shaped like cone has a diameter of 33 cm.

The height is 40.5 cm.

WRITE the correct EQUATION to solve for the building's volume. Then SOLVE it!

(Round your answer to the nearest tenths.)

V = 1/3 pi (16.5)^2 (40.5)

V = 11,456.5 square cm.

400

The toy shaped like CYLINDER has a radius of 7.625 inches.

The height is 10.25 inches.

WRITE the correct EQUATION to solve for the toy's volume. Then SOLVE it!

(Round your answer to the nearest hundredths.)

V = pi (7.625)^2 (10.25)

V = 1,872.21

400

Write the equation and Solve for the volume of Sphere with a diameter of 5.15 meters.

(Round your answer to the nearest hundredths.)

V = 4/3 pi (2.575)^3

V = 71.52 sq. m.

400

The cylinder has a height of 20.9 inches and a diameter of 16.5 inches.

WRITE the EQUATION that will help solve for the Total surface area of the cylinder AND SOLVE it!

(Round your final answer to the nearest hundredths.)

L.S.A. = 2pi (8.25) (20.9) + 2pi (8.25)^2

L.S.A. = 1,511.03 sq. in.

400

Solve for the y-intercept,b, of a line that passes through the point (8, 4) and point (2, 1).

b = 0

500

The toy shaped like cone has a radius of 45 cm.

The height is 39.2 cm.

WRITE the correct EQUATION to solve for the building's volume. Then SOLVE it!

(Round your answer to the nearest tenths.)

V = 1/3 pi (45)^2 (39.2)

V = 83,126.5 cm^2

500

The toy shaped like CYLINDER has a diameter of 9.45 inches.

The height is 5.25 inches.

WRITE the correct EQUATION to solve for the toy's volume. Then SOLVE it!

(Round your answer to the nearest hundredths.)

V = pi (4.725)^2 (5.25)

V = 368.22 sq. in.

500

Write the equation and Solve for the volume of Sphere with a radius of 1.15 inches.

(Round your answer to the nearest hundredths.)

V = 4/3 pi (1.15)^3

V = 6.37 sq. in.

500

The cylinder has a height of 9.5 inches and a diameter of 6.5 inches.

WRITE the EQUATIONS that will help solve for the TOTAL and LATERAL surface area of the cylinder AND then SOLVE it!

(Round your final answers to the nearest hundredths.)

L.S.A. = 2pi (3.25) (9.5)

L.S.A. = 193.99 sq. in.

T.S.A. = 2pi (3.25) (9.5) + 2pi (3.25)^2

T.S.A. = 260.36 sq. in.

500

Solve for the y-intercept,b, of a line that passes through the point (8, 4) and point (9, 8).

b = -28