None. The factorization of integers is unique.
2 ways
1+1 1*2
2(x-3) is 2x-6 factorized
It is: 2(11x+3) when factorized
Suppose you have a prime factor with an exponent of n. Then that prime factor can appear 0, 1, 2, ... , n times in a compound factor: that is, there are (n+1) different exponents that it can take.
NO, 6 is a rational number because it can be expressed a number of different ways, including as 12/2 where 12 and 2 are integers.
A squared takeaway 36 can be expressed as (x^2 - 36). This is a difference of squares, which can be factorized using the formula (a^2 - b^2 = (a - b)(a + b)). Therefore, (x^2 - 36) can be factorized as ((x - 6)(x + 6)).
The number 2 can be expressed in many different ways. For example the number2 in roman numerals is expressed as II In binary the number 2 is expressed as 10 Different cultures both past and present also had there own ways of writing the number two The standard Chinese( simple numerals) expression is It can also be expressed many different ways through use of mathematical statements. A few examples are: 1+1, 3-1, 6/3. An algebraic expressions could be x - 6 = -4, x=2
52 can be factorized as 1*52 or 2*26 or 4*13.
5.05 is equivalent to 5.05. No other number is equivalent, though you might write the number in different ways, i.e., using different expressions that evaluate to that number.
144 is the answer to 122 so can be easily prime factorized as 2x2x2x2x3x3 72 is 9x8, so can be prime factorized as 2x2x2x3x3 These two numbers, therefore, have in common prime factors of 2, 2, 2, 3 and 3. Their greatest common factor is 72.
To determine the number of ways to arrange 4 different colored flags, you can use the factorial of the number of flags. This is calculated as 4! (4 factorial), which equals 4 × 3 × 2 × 1 = 24. Therefore, there are 24 different ways to arrange the 4 different colored flags.