0
What else can I help you with?
What is the product of 3 and N?
A product of 3 and N would be 3 and N multiplied together, so the product would be 3N. To get a numeric answer, you would first need to find what the value of N is.
The product of a number and 3 is -21?
24
What is the power 3 as a product of the same factor?
n to the 3rd power is n x n x n
How do you write the product of 3 and n?
3n is the simplest, but you could also write it as 3*n or 3.n or 3xn. The problem with the last form is that it could represent the product of 3 and x and n.
3 less than the product of 4 and n?
The equation = 4n-3
What is the product of 3 and 6 more than a number?
3*(n+6)
For what values of n will the product 3n be less than a 50?
3n < 50 if 3n/3 < 50/3 that is, if n < 50/3 = 162/3.
What is the product of a9 times a3?
The product of ( a^9 ) times ( a^3 ) can be calculated using the property of exponents that states ( a^m \times a^n = a^{m+n} ). Therefore, ( a^9 \times a^3 = a^{9+3} = a^{12} ).
Why is the product of 3 consecutive integers always divisible by 6?
Let the three integers be, n, (n + 1), and (n + 2) Then at least one of these numbers is even and therefore has a factor of 2. And one of the numbers is divisible by 3 **. Therefore the product has factors of 2 and 3 and is thus divisible by 2 x 3 = 6. ** Either n is divisible by 3. Or, n leaves a remainder of 1 when divided by 3 in which case (n + 2) is divisible by 3. Or, n leaves a remainder of 2 when divided by 3 in which case (n + 1) is divisible by 3.
Best represents the product of two consecutive integers?
The product of two consecutive integers can be represented mathematically as ( n(n + 1) ), where ( n ) is any integer. This expression captures the idea that the two integers are ( n ) and ( n + 1 ). For example, if ( n = 3 ), the product would be ( 3 \times 4 = 12 ). This representation highlights the relationship between consecutive numbers in a simple algebraic form.
What is the power of the product of the same factor then find the value?
The power of a product states that when you raise a product of factors to a power, you can distribute the exponent to each factor. Mathematically, this is expressed as ((ab)^n = a^n \times b^n). If you have the same factor, such as (a), the expression ((a^m)^n) simplifies to (a^{m \cdot n}). For example, if (a = 2), (m = 3), and (n = 2), then ((2^3)^2 = 2^{3 \cdot 2} = 2^6 = 64).
What are the release dates for A-N-T- Farm - 2011 Product MisplacemANT 3-9?
A-N-T- Farm - 2011 Product MisplacemANT 3-9 was released on: USA: 20 September 2013
