The expression is: x/2
2
Answer: (x-2) (x2-5x+6)/(x-3) =(X-3)X(X-2)/(X-3) <-You factor the expression (x2-5x+6) and get (x-3)(x-2) =(X-2) <-The (x-3)'s in the numerator and denominator cancel each other out (because an expression divided by the same expression equals one) and thus you are left with (x-2).
Another way of writing X squared divided by 2 is (X^2)/2. This notation represents the expression X squared (X^2) being divided by 2. The use of parentheses helps clarify the order of operations, ensuring that the square of X is divided by 2.
19
x9/x2 = x9-2 = x7
2
2
Answer: (x-2) (x2-5x+6)/(x-3) =(X-3)X(X-2)/(X-3) <-You factor the expression (x2-5x+6) and get (x-3)(x-2) =(X-2) <-The (x-3)'s in the numerator and denominator cancel each other out (because an expression divided by the same expression equals one) and thus you are left with (x-2).
Another way of writing X squared divided by 2 is (X^2)/2. This notation represents the expression X squared (X^2) being divided by 2. The use of parentheses helps clarify the order of operations, ensuring that the square of X is divided by 2.
The reciprocal of any expression is 1 divided by that expression. In this case, the reciprocal of x2 is 1/x2. This can also be written as (1/x)2, or as x-2.
19
23.5
x9/x2 = x9-2 = x7
x/2 - 3/4
2 divided by x-12-x divided by x-2 is -1/(6(x-2)).
To simplify the expression ((x^2 - 10x + 25) ÷ (x - 5)), we first recognize that the numerator can be factored. The expression (x^2 - 10x + 25) can be factored as ((x - 5)^2). Therefore, when we divide ((x - 5)^2) by ((x - 5)), we get (x - 5), provided (x \neq 5).
0.25