14. INTEGERS
« First Topic in Last Topic in »
14. INTEGERS

292013 The predecessor of the integer -1 is:

1 0
2 2
3 -2
4 1
14. INTEGERS

292014 Difference of sums of 998 and -486 from 290 and 732

1 -510
2 +510
3 -1022
4 +512
14. INTEGERS

292015 When a negative integer is subtracted from another negative integer, the sign of the result:

1 Is always negative.
2 Is always positive.
3 Is never negative.
4 Depends on the numerical value of the integers.
14. INTEGERS

292016 Let n be an integer number. Prove that the equation has infinitely x\(^{\1}\) + y\(^{\1}\) = n + z\(^{\1}\) many integer solutions.

1 z = x − 1
2 z = x + 1
3 z = x × 1
4 z = x /1
14. INTEGERS

292017 The sum of two integers is -35. If one of them is 40, then the other is:

1 5
2 -75
3 75
4 -5
Join With Us for More Updates
14. INTEGERS

292013 The predecessor of the integer -1 is:

1 0
2 2
3 -2
4 1
14. INTEGERS

292014 Difference of sums of 998 and -486 from 290 and 732

1 -510
2 +510
3 -1022
4 +512
14. INTEGERS

292015 When a negative integer is subtracted from another negative integer, the sign of the result:

1 Is always negative.
2 Is always positive.
3 Is never negative.
4 Depends on the numerical value of the integers.
14. INTEGERS

292016 Let n be an integer number. Prove that the equation has infinitely x\(^{\1}\) + y\(^{\1}\) = n + z\(^{\1}\) many integer solutions.

1 z = x − 1
2 z = x + 1
3 z = x × 1
4 z = x /1
14. INTEGERS

292017 The sum of two integers is -35. If one of them is 40, then the other is:

1 5
2 -75
3 75
4 -5
For More Updates join with Us
14. INTEGERS

292013 The predecessor of the integer -1 is:

1 0
2 2
3 -2
4 1
14. INTEGERS

292014 Difference of sums of 998 and -486 from 290 and 732

1 -510
2 +510
3 -1022
4 +512
14. INTEGERS

292015 When a negative integer is subtracted from another negative integer, the sign of the result:

1 Is always negative.
2 Is always positive.
3 Is never negative.
4 Depends on the numerical value of the integers.
14. INTEGERS

292016 Let n be an integer number. Prove that the equation has infinitely x\(^{\1}\) + y\(^{\1}\) = n + z\(^{\1}\) many integer solutions.

1 z = x − 1
2 z = x + 1
3 z = x × 1
4 z = x /1
14. INTEGERS

292017 The sum of two integers is -35. If one of them is 40, then the other is:

1 5
2 -75
3 75
4 -5
NEET DIGITAL LIBRARY
14. INTEGERS

292013 The predecessor of the integer -1 is:

1 0
2 2
3 -2
4 1
14. INTEGERS

292014 Difference of sums of 998 and -486 from 290 and 732

1 -510
2 +510
3 -1022
4 +512
14. INTEGERS

292015 When a negative integer is subtracted from another negative integer, the sign of the result:

1 Is always negative.
2 Is always positive.
3 Is never negative.
4 Depends on the numerical value of the integers.
14. INTEGERS

292016 Let n be an integer number. Prove that the equation has infinitely x\(^{\1}\) + y\(^{\1}\) = n + z\(^{\1}\) many integer solutions.

1 z = x − 1
2 z = x + 1
3 z = x × 1
4 z = x /1
14. INTEGERS

292017 The sum of two integers is -35. If one of them is 40, then the other is:

1 5
2 -75
3 75
4 -5
Join With Us for More Updates
14. INTEGERS

292013 The predecessor of the integer -1 is:

1 0
2 2
3 -2
4 1
14. INTEGERS

292014 Difference of sums of 998 and -486 from 290 and 732

1 -510
2 +510
3 -1022
4 +512
14. INTEGERS

292015 When a negative integer is subtracted from another negative integer, the sign of the result:

1 Is always negative.
2 Is always positive.
3 Is never negative.
4 Depends on the numerical value of the integers.
14. INTEGERS

292016 Let n be an integer number. Prove that the equation has infinitely x\(^{\1}\) + y\(^{\1}\) = n + z\(^{\1}\) many integer solutions.

1 z = x − 1
2 z = x + 1
3 z = x × 1
4 z = x /1
14. INTEGERS

292017 The sum of two integers is -35. If one of them is 40, then the other is:

1 5
2 -75
3 75
4 -5