General rules of Geometry and Arithmetic Class 6 Maths MCQ Question and Answers. Important MCQ on General rules of Geometry and Arithmetic 6th Standard Mathematics Subject.
General rules of Geometry and Arithmetic Class 6 Maths MCQ
(1) A symbol having a fixed numerical value is called a ____
(a) Constant
(b) Variable
(c) Both
(d) None
Ans: (a) Constant
(2) A symbol having a fixed numerical value is called a _________
(a) Constant
(b) Variable
(c) Both
(d) None
Ans: (b) Variable
(3) An equation has two sides called _______ and _______
(a) R.H.S.
(b) L.H.S.
(c) L.H.S. and R.H.S.
(d) None
Ans: (c) L.H.S. and R.H.S.
(4) A statement of equality in which one or two variable are involved is called an ______
(a) None
(b) Constant
(c) Variable
(d) Equation
Ans: (d) Equation
(5) The rule which gives the number of match sticks required to make the match stick pattern L, is
(a) 2n
(b) 3n
(c) 4n
(d) 5n
Ans: (a) 2n
(6) The rule which gives the number of matchsticks required to make the match stick pattern C, is
(a) 5n
(b) 3n
(c) 4n
(d) 2n
Ans: (b) 3n
(7) The rule which gives the number of matchsticks required to make the matchsticks pattern F, is
(a) 2n
(b) 3n
(c) 4n
(d) 5n
Ans: (c) 4n
(8) The rule which gives the number of matchsticks required to make the matchstick pattern u, is
(a) 5n
(b) 4n
(c) 2n
(d) 3n
Ans: (d) 3n
(9) The rule which gives the number of matchsticks required to make the matchsticks pattern V, is
(a) 2n
(b) 3n
(c) 4n
(d) 5n
Ans: (a) 2n
(10) The rule which gives the number of matchsticks required to make the matchsticks pattern A, is
(a) 2n
(b) 6n
(c) 4n
(d) 5n
Ans: (b) 6n
(11) The rule which gives the number of matchsticks required to make the matchsticks pattern B, is
(a) 2n
(b) 5n
(c) 6n
(d) 7n
Ans: (c) 6n
(12) The rule which gives the number of matchsticks required to make the matchsticks pattern E, is
(a) 2n
(b) 6n
(c) 7n
(d) 5n
Ans: (d) 5n
(13) The rule which gives the number of matchsticks required to make the matchsticks pattern D, is
(a) 4n
(b) 5n
(c) 6n
(d) 7n
Ans: (a) 4n
(14) The rule which give the number of matchsticks required to make the matchsticks pattern H, is
(a) 4n
(b) 5n
(c) 3n
(d) 2n
Ans: (b) 5n
(15) The rule which give the number of matchsticks required to make the matchsticks pattern Y, is
(a) 3n
(b) 4n
(c) 2n
(d) n
Ans: (a) 3n
(16) The rule which give the number of matchsticks required to make the matchsticks pattern X, is
(a) 4n
(b) 2n
(c) 6n
(d) 5n
Ans: (b) 2n
(17) The rule which give the number of matchsticks required to make the matchsticks pattern Z, is
(a) 5n
(b) 2n
(c) 3n
(d) n
Ans: (c) 3n
(18) The rule which give the number of matchsticks required to make the matchsticks pattern N, is
(a) 4n
(b) n
(c) 2n
(d) 3n
Ans: (d) 3n
(19) The rule which give the number of matchsticks required to make the matchsticks pattern P, is
(a) 4n
(b) 3n
(c) 2n
(d) n
Ans: (A) 4n
(20) The rule which give the number of matchsticks required to make the matchsticks pattern R, is
(a) 3n
(b) 5n
(c) 6n
(d) 2n
Ans: (b) 5n
(21) The rule which give the number of matchsticks required to make the matchsticks pattern T, is
(a) 5n
(b) 3n
(c) 2n
(d) 6n
Ans: (c) 2n
(22) The rule which give the number of matchsticks required to make the matchsticks pattern M, is
(a) n
(b) 2n
(c) 3n
(d) 4n
Ans: (d) 4n
(23) The rule which give the number of matchsticks required to make the matchsticks pattern, W is
(a) 4n
(b) 2n
(c) 3n
(d) 5n
Ans: (a) 4n
(24) The rule which give the number of matchsticks required to make the matchsticks pattern, I is
(a) 2n
(b) n
(c) 3n
(d) 5n
Ans: (b) n
(25) The rule which give the number of matchsticks required to make the matchsticks pattern , J is
(a) 6n
(b) 2n
(c) 3n
(d) 4n
Ans: (c) 3n
(26) The side of a square is L. Its perimeter is
(a) L
(b) 2L
(c) 3L
(d) 4L
Ans: (d) 4L
(27) The side of a equilateral triangle is L, its perimeter is
(a) 5L
(b) 2L
(c) 3L
(d) 4L
Ans: (c) 3L
(28) Not done
(29) Not none
(30) The side of a regular pentagon is L, its perimeter is
(a) 3L
(b) 2L
(c) 6L
(d) 5L
Ans: (d) 5L
(31) The side of a regular hexagon is L, its perimeter is
(a) 6L
(b) 5L
(c) 4L
(d) 3L
Ans: (a) 6L
(32) The side of a regular heptagon is L, its perimeter is
(a) 6L
(b) 7L
(c) 5L
(d) 4L
Ans: (b) 7L
(33) Not done
(34) The side of regular nonagon is L, its perimeter is
(a) 5L
(b) 8L
(c) 9L
(d) 10L
Ans: (c) 9L
(35) The side of a regular is L, its perimeter is
(a) 3L
(b) 4L
(c) 5L
(d) 6L
Ans: (d) 6L
(36) The side of a regular decagon is L, its perimeter is
(a) 10L
(b) 11L
(c) 12L
(d) 13L
Ans: (a) 10L
(37) The length of a edge of a cube is L, the total length of its edge is
(a) 11L
(b) 12L
(c) 10L
(d) 14l
Ans: (b) 12L
(38) The value of variable in the expression is
(a) Not fixed
(b) Fixed
(c) Zero
(d) None
Ans: (a) Not fixed
(39) The length of a rectangular hall is 4m less than 3 times the breadth of the hall. What is the length, if the breadth is ‘b’ m?
(a) 3b + 4
(b) 3b – 4
(c) b + 4
(d) b – 4
Ans: (b) 3b – 4
(40) ‘2 × (7 + 3) = 2 × 7 + 2 × 3’ which properties?
(a) Commutative property under addition
(b) Associative property
(c) Closure property
(d) Distributive property
Ans: (a) Commutative property under addition
(41) x + y = 5 + x is
(a) Associative property
(b) Closure property
(c) Distributive property
(d) Commutative property
Ans: (d) Commutative property
(42) Perimeter of a triangle, whose each side is x unit is
(a) 3x
(b) 3 – x
(c) 3 + x
(d) 3/x
Ans: (a) 3x
(43) a × b = b × a is
(a) Closure property
(b) Associative property under multiplication
(c) Distributive property
(d) Associative property
Ans: (b) Associative property under multiplication
(44) x + y = 5 + x is
(a) Commutative property
(b) Closure property
(c) Distributive property
(d) Associative property
Ans: (a) Commutative property
(45) 7 × (2 × 3) = 7 × 2 + 7 × 3
(a) Associative property
(b) Distributive property with multiplication
(c) Closure property
(d) None
Ans: (b) Distributive property with multiplication
(46) a × 1 = 1 × a
(a) Associate property
(b) Multiplicative property Identity
(c) Closure property
(d) None
Ans: (b) Multiplicative property Identity
(47) p × 0 = 0 × p = 0
(a) Distributive property
(b) Associative property
(c) Multiplication with ‘0’
(d) None
Ans: (c) Multiplication with ‘0’
(48) 8 + 3 = 3 + 8
(a) Both
(b) None
(c) Closure property
(d) Commutatively of addition
Ans: (d) Commutatively of addition
(49) B × L × O = L × ___ × O = 0
(a) B
(b) L
(c) O
(d) None
Ans: (a) B
(50) 6 × (2 + 5) = 6 × 2 + ____ × 5
(a) 5
(b) 6
(c) 2
(d) None
Ans: (b) 6
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