Study guides

☆☆

Q: Is 93 a product of two consecutive integers?

Write your answer...

Submit

Still have questions?

Related questions

46 & 47

The integers are 93 and 95.

They are 92 and 93.

The numbers are 93 and 95.

If you define a rectangular number as a number which is the product of two consecutive integers, none of them qualify.

If you define a rectangular number as a number which is the product of two consecutive integers, none of them qualify.

find three consecutive integers whose sum is - 93

They are: 93+95 = 188

Divide the sum of the three consecutive odd integers by 3: 93 / 3 = 31. The smallest of these integers will be two less than 31 and the largest will be two more than 31, so the three consecutive odd integers will be 29, 31, and 33.

Divide the sum of the three consecutive odd integers by 3: -273 /3 = -91. The smallest of these integers will be two less than -91 and the largest will be two more than -91, so the three consecutive odd integers will be -89, -91, and -93.

-33 + -33 + -29 = -93

96

They are -32, -31 and -30.

30 + 31 + 32 = 93 ( I forgot how to find this algebraically )

96

If you define a rectangular number as a number which is the product of two consecutive integers, none of them qualify.

-30 -31 -32

The numbers are -95, -93, and -91.

96

-33, -31, -29

-30,-31,-32

They are: 92+93+94+95 = 374

Middle integer must be a third of 93 so integers are 30, 31 and 32.

The numbers are 92 and 93.

The smallest six consecutive composite integers are:90, 91, 92, 93, 94, 95.(And 96 is also composite, for a run of seven consecutive.)Is that what you were asking ?