7n + 7 = 12
Subtract 7 from each side of the equation :
7n = 5
Divide each side by 7 :
n = 5/7
To find what is 999 less than 45 increased by the product of a number and 85, we can express this mathematically. First, calculate 45 increased by the product of a number (let's call it ( x )) and 85, which is ( 45 + 85x ). Then, subtract 999 from this result: ( 45 + 85x - 999 ). Simplifying this gives ( 85x - 954 ).
88
To find the product of -8 and 24, you simply multiply the two numbers together. The result is -192. Multiplying a negative number by a positive number will always result in a negative product.
A number multiplied by another number to find the product involves taking the first number (the multiplicand) and multiplying it by the second number (the multiplier). The result of this operation is called the product. For example, if you multiply 3 by 4, the product is 12.
a number increased by -22 is 45. find the number
88
(7 * x) + 2 = 187x + 2 = 187x = 18 -27x = 16x = 16/7x = 2 2/7
A single number cannot have a product: a product is the result of a BINARY OPERATION and this means that it must have two inputs.
2
To find the product of -8 and 24, you simply multiply the two numbers together. The result is -192. Multiplying a negative number by a positive number will always result in a negative product.
The product is the result of a multiplication sum. Since this sum has just one number in the question part, it is impossible to find the product of this single number.
a number increased by -22 is 45. find the number
A product is a binary operator. That means a product is the result of combining TWO numbers. You cannot have a product of just one number - whether it is a fraction or not is irrelevant.
x+8+x/5 = 20 x = 10
To find the number, we can divide 24 by 0.12. The result is 200, so the number that when multiplied by 0.12 gives the product 24 is 200.
It is very difficult to factorise a number that is the product of two very large primes but, given one of these primes, it is very easy to verify the result and to find the other prime.It is very difficult to factorise a number that is the product of two very large primes but, given one of these primes, it is very easy to verify the result and to find the other prime.It is very difficult to factorise a number that is the product of two very large primes but, given one of these primes, it is very easy to verify the result and to find the other prime.It is very difficult to factorise a number that is the product of two very large primes but, given one of these primes, it is very easy to verify the result and to find the other prime.
product