Home
Class 6
MATHS
(a) Write four negative integers greater...

(a) Write four negative integers greater than `−20`. (b) Write four negative integers less than`−10`.

Text Solution

Verified by Experts

(a) `-19,-18,-17,-16`
(b) `-11,-12,-13,-14`
answer
Promotional Banner

Topper's Solved these Questions

  • INTEGERS

    NCERT ENGLISH|Exercise EXERCISE 6.3|4 Videos

  • INTEGERS

    NCERT ENGLISH|Exercise EXERCISE 6.2|5 Videos

  • FRACTIONS

    NCERT ENGLISH|Exercise EXERCISE 7.3|9 Videos

  • KNOWING OUR NUMBERS

    NCERT ENGLISH|Exercise EXERCISE 1.3|3 Videos

Similar Questions

Explore conceptually related problems

Write two negative integers greater than -31.

Write 3 negative integers lesser than -15.

(i) Write 4 negative integers less than -10 (ii) Write 6 negative integers just greater than -12

Write four consecutive odd integers preceding 3.

(a) Write a pair of negative integers whose difference gives 8. (b) Write a negative integer and a positive integer whose sum is -5. (c) Write a negative integer and a positive integer whose difference is -3.

Write four consecutive odd integers preceding - 47.

Write four consecutive odd integers preceding -37 .

Which of the following statements are true? (i) The smallest integer is zero (ii) The opposite of zero is zero (iii) Zero is not an integer (iv) 0 is larger than every negative integer. (v) The absolute value of an integer is greater than the integer. (vi)A positive integer is greater than its opposite (vii)Every negative integer is less than every natural number. (viii)0 is the smallest positive integer.

Write four consecutive even integers succeeding -76.

Which of the following statement are true? (i) The product of a positive and negative integer is negative. (ii) The product of three negative integers is a negative integer. (iii) Of the two integers, if one is negative, then their product must be positive. (iv) For all non-zero integers a and b , axxb is always greater than either a or b. (v) The product of a negative and a positive integer may be zero. (vi) There does not exist an integer b such that for a gt1, axxb=bxxa=b.