Simple Equations – Chapter 4/MCQ/CBSE Class 7 Mathematics
CBSE Class 7 Mathematics/Simple Equations – Chapter 4/MCQ is about the Multiple Choice Questions that you can expect for Yearly Examination. Here you can find out practice problems for Class 7 Mathematics. This worksheet is designed for CBSE Class 7 students.
CBSE Class 7 Mathematics/Simple Equations – Chapter 4
Extra Questions for Practice/Model Questions/MCQ
Choose the correct answer from the options given below:
- Write the statement as an equation: “4 subtracted from twice a number y is 12”
A. 4 – 2y = 12
B. 2y – 4 = 12
C. 2 – 4y = 12
D. 4y – 2 = 12 - “One third of a number x minus 3 gives 5” can be written as ——–
A. x/3 – 3 = 5
B. x – 1/3 = 5
C. 3 – x/3 = 5
D. x/3 + 3 = 5 - The solution of the equation 2x = 6 is ————-
A. x = 1
B. x = 2
C. x = 3
D. x = 4 - The solution of the equation x + 3 = 10 is ———-
A. x = 13
B. x = 10
C. x = 7
D. x = 4 - The solution of the equation 3p – 4 = 11 is ———–
A. p = 3
B. p = 4
C. p = 5
D. p = 6 - The solution of the equation 2(x + 4) = 12 is —————
A. x = 1
B. x = 2
C. x = 3
D. x = 4 - “3 added to thrice a number z give 15” Find the number?
A. z = 3
B. z = 4
C. z = 5
D. z = 6 - The solution of the equation 3p + 5 = 14 is ————
A. p = 2
B. p = 3
C. p = 4
D. p = 5 - The solution of the equation 2p – 4 = 16 is —————
A. p = 5
B. p = 10
C. p = 15
D. p = 20 - “Twice a number increased by 4 gives 10” Find the number?
A. y = 1
B. y = 2
C. y = 3
D. y = 4 - “Add 3 to one third of a number gives 7” Find the number?
A. y = 4
B. y = 10
C. y = 12
D. y = 9 - “Sum of 3 times a number p and 12 is 15” Find the number?
A. p = 0
B. p = 1
C. p = 2
D. p = 3 - If k + 3 = 5, then find the value of 2k + 3?
A. k = 3
B. k = 5
C. k = 7
D. k = 9 - Which of the following equations having 5 as a solution?
A. 3x = 15
B. 3x + 5 = 15
C. 5x + 3 = 10
D. 3 + x = 15 - The solution of 5y = 20 is —————
A. y = 2
B. y = 3
C. y = 4
D. y = 5
ANSWERS:
- 2y – 4 = 12
- x/3 – 3 = 5
- 3
- x = 7
- p = 5
- x = 2
- z = 4
- p = 3
- p = 10
- y = 3
- y = 12
- p = 1
- k = 7
- 3x = 15
- y = 4