210 likes | 389 Views
GMS Test Taking Strategy. CUBES. Problem. C. U. Solving. B. Steps. E. S. C. Circle Numbers (Math and Science) Circle Main Ideas (Language Arts and Social Studies). u. Underline Key Words. B. Bracket the Question. E. Eliminate Extra Info. S. Show all Work. 14 cm. 20 cm.
E N D
GMS Test Taking Strategy CUBES
Problem C U Solving B Steps E S
C Circle Numbers (Math and Science) Circle Main Ideas (Language Arts and Social Studies) u Underline Key Words B Bracket the Question E Eliminate Extra Info S Show all Work
14 cm 20 cm Practice Problem 1 Justin uses a container in the shape of a cylinder to store his markers. The diagram below shows the dimensions of the container. Which of the following is closest to the volume of the container? A 3,077 cm3 B 1,758 cm3 C 879 cm3 D 440 cm3
14 cm 20 cm C Justin uses a container in the shape of a cylinder to store his markers. The diagram below shows the dimensions of the container. Which of the following is closest to the volume of the container? A 3,077 cm3 B 1,758 cm3 C 879 cm3 D 440 cm3
14 cm 20 cm u Justin uses a container in the shape of a cylinder to store his markers. The diagram below shows the dimensions of the container. Which of the following is closest to the volume of the container? A 3,077 cm3 B 1,758 cm3 C 879 cm3 D 440 cm3
14 cm 20 cm B Justin uses a container in the shape of a cylinder to store his markers. The diagram below shows the dimensions of the container. Which of the following is closest to the volume of the container? A 3,077 cm3 B 1,758 cm3 C 879 cm3 D 440 cm3
14 cm 20 cm E Justin uses a container in the shape of a cylinder to store his markers. The diagram below shows the dimensions of the container. Which of the following is closest to the volume of the container? A 3,077 cm3 B 1,758 cm3 C 879 cm3 D 440 cm3
S 14 cm 20 cm Justin uses a container in the shape of a cylinder to store his markers. The diagram below shows the dimensions of the container. Π= 3.14 r= 7 cm h= 20 cm v=3.14 x 7 x 7 x 20 v=3.14 x 49 x 20 v=153.86 x 20 v= 3077.2 cm3 Which of the following is closest to the volume of the container? A 3,077 cm3 B 1,758 cm3 C 879 cm3 D 440 cm3
Practice Problem 2 The diagram shows a pool enclosed by a rectangular fence. What would be a reasonable estimate for the amount of fencing needed? A Between 31 ft and 45 ft B Between 45 ft and 60 ft C About 82 ft D About 300 ft 28.9 ft 12.2 ft
C The diagram shows a pool enclosed by a rectangular fence. What would be a reasonable estimate for the amount of fencing needed? A Between 31 ft and 45 ft B Between 45 ft and 60 ft C About 82 ft D About 300 ft 28.9 ft 12.2 ft
u The diagram shows a pool enclosed by a rectangular fence. What would be a reasonable estimate for the amount of fencing needed? A Between 31 ft and 45 ft B Between 45 ft and 60 ft C About 82 ft D About 300 ft 28.9 ft 12.2 ft
B The diagram shows a pool enclosed by a rectangular fence. What would be a reasonable estimate for the amount of fencing needed? A Between 31 ft and 45 ft B Between 45 ft and 60 ft C About 82 ft D About 300 ft 28.9 ft 12.2 ft
E The diagram shows a pool enclosed by a rectangular fence. What would be a reasonable estimate for the amount of fencing needed? A Between 31 ft and 45 ft B Between 45 ft and 60 ft C About 82 ft D About 300 ft 28.9 ft 12.2 ft
S The diagram shows a pool enclosed by a rectangular fence. What would be a reasonable estimate for the amount of fencing needed? A Between 31 ft and 45 ft B Between 45 ft and 60 ft C About 82 ft D About 300 ft 28.9 ft 12.2 ft
S The diagram shows a pool enclosed by a rectangular fence. What would be a reasonable estimate for the amount of fencing needed? A Between 31 ft and 45 ft B Between 45 ft and 60 ft C About 82 ft D About 300 ft 28.9 ft 12.2 ft
Practice Problem 3 Kari is making a pencil holder. The bottom of the holder is a circle with a diameter of 8 cm. How long must a piece of ribbon be to go around the bottom? Use 3.14 for . A 12.56 cm B 18.84 cm C 25.12 cm D 50.24 cm
S B C u Kari is making a pencil holder. The bottom of the holder is a circle with a diameter of 8 cm. How long must a piece of ribbon be to go around the bottom? Use 3.14 for π . A 12.56 cm B 18.84 cm C 25.12 cm D 50.24 cm E
Kari is making a pencil holder. The bottom of the holder is a circle with a diameter of 8 cm. How long must a piece of ribbon be to go around the bottom? Use 3.14 for . A 12.56 cm B 18.84 cm C 25.12 cm D 50.24 cm
B C Problem C u U Solving B Steps E E S S