Some motherboard form factors (from smallest to largest in physical size) are:
-Mini ITX
-Micro ATX
-ATX
-E ATX
The form facter relates to the actual dimensions of the motherboard itself. There are 2 sizes: Large and Small. ATX = Large, mATX = Small.
P8 and P9
Personal System 2 (IBM PC and a connector format)
To work out the prime factors of 180 in index form, you first need to find the prime factors of 180. Start by dividing 180 by the smallest prime number, which is 2. Continue dividing by prime numbers until you cannot divide any further. The prime factors of 180 are 2, 2, 3, 3, and 5. In index form, this would be written as 2^2 * 3^2 * 5.
Prime factors in exponent form: 2^2 * 17
The prime factors are: 55 = 5 * 11 122 = 2 * 61 So 55 over 122 is already in its simplest form, since the numerator and denominator do not share any prime factors.
"In simplest form" means no factors (or divisors) in common between numerator and denominator. You start by factoring both: 65/94 = ( 5*13) / ( 2*47) It helps to know that 2, 5, 13, and 47 are all prime numbers. No smaller factors are present in any of them. As there are no common factors to cancel out, 65/94 is already in simplest form.
Because the motherboard is made 2 support a certain amount.like 2.8,3.0.if u try 2 put a higher prrosser it may burn Ur motherboard.
It is: 2^2 times 3^2 = 36
To put a fraction in its simplest form, you first need to identify any common divisors. In this case, the factors of 6 are 1, 2, 3 and 6. The factors of 41 are 1 and 41. Thus there are no useful common factors of 6 and 41. Therefore the fraction is already in its simplest form at 6/41.
Form Factor determines if something is the right size and shape to fit in a given case. Most cases are ATX. If you get an ATX case, your motherboard and expansion cards must also be ATX. micro-ATX and miniATX are also different kinds of form factor.
To write 72 as a product of prime factors in exponential form, we first break down 72 into its prime factors: 72 = 2 x 2 x 2 x 3 x 3. Then, we can rewrite this as 72 = 2^3 x 3^2 in exponential form.