60/4 and 60 x 4. Answer, 60 and 4
The number 240 can be expressed as a product of its prime factors: 240 = 2^4 × 3 × 5. Additionally, it can also be represented as a product of other integers, such as 240 = 10 × 24 or 240 = 12 × 20. These factorizations illustrate different ways to express 240 as a product of numbers.
24
322 to 563 is 242 whole numbers inclusively. But, as the question was 'between' 322 and 563, then the number would be 242 - 2 = 240
278
First, we are not interested for the sign of the numbers, because the product of two negative numbers is always positive, so we need to find the two consecutive factors of 240, which are 15 and 16. Thus, the numbers are -16 and -15.
The number 240 can be expressed as a product of its prime factors: 240 = 2^4 × 3 × 5. Additionally, it can also be represented as a product of other integers, such as 240 = 10 × 24 or 240 = 12 × 20. These factorizations illustrate different ways to express 240 as a product of numbers.
240/15 = 16
The two numbers that have a product of -240 and a sum of 1 are 16 and -15. This is because 16 multiplied by -15 equals -240, and 16 added to -15 equals 1. These two numbers satisfy both conditions simultaneously.
24
322 to 563 is 242 whole numbers inclusively. But, as the question was 'between' 322 and 563, then the number would be 242 - 2 = 240
-238
278
15 and 16. or -16 and -15
Whole numbers include 235, 236, 237, 238 and 239
First, we are not interested for the sign of the numbers, because the product of two negative numbers is always positive, so we need to find the two consecutive factors of 240, which are 15 and 16. Thus, the numbers are -16 and -15.
To find three numbers that multiply to equal 240, one possible combination is 4, 5, and 12, since 4 × 5 × 12 = 240. Another combination is 3, 8, and 10, as 3 × 8 × 10 also equals 240. There are multiple sets of numbers that can achieve this product.
2 x 2 x 2 x 2 x 3 x 5 = 240