K=1
A true statement.
It is a true statement.
By moving all other values to one side and setting it equal to X. For instance, x-12=24. To find the "x" value, add 12 to both sides of the equation which will result in x=36. We know that x=36 is true because when we "plug-in" or "substitute" every "x" in the original equation with the value "36", we should get matatically true statements. For instance 36-12=24 is a true statement.
Julian will get his treat after dinner no matter what on the 12/11/12. True statement
8 = 12 is FALSE. So, the value of n, in a false statement can be anything at all.
If (-12, 24) satisfies the equation (makes it a true statement), then it is a solution to the equation. Chek: y = x + 12; replace y with 24, and x with -12 24 =? -12 + 12 24 = 0 false Therefore, (-12, 24) is not a solution.
The solution set is the answers that make an equation true. So I would call it the solution.
The subtraction is not commutative, it means that n - 12 is not the same as 12 - n, except when n is 12. For example, suppose that we have a statement such as n - 12 = 12 - n. Can we find a value for n which will satisfy our statement?n - 12 = 12 - n (add n and 12 to both sides)n + n - 12 + 12 = 12 + 12 - n + n2n = 24 (divide by 2 both sides)n = 12Check:n - 12 = 12 - n12 - 12 =? 12 - 120 = 0 TrueBut, for all other values of n, the statement is not true. Let's say that n = 20Does 20 satisfies the statement? Check:n - 12 = 12 - n20 - 12 =? 12 - 208 = -8 FalseHence, we cannot write n - 12 as 12 - n for n ≠12.
The answer is: True. 12 over 16, or 12/16 is 0.75, or three quarters, which is also written as 3/4. (because 12 divided by 4 is 3, and 16 divided by 4 is 3) 3 over 4, or 3/4 is also 0.75, or three quarters (again 3/4). Any anything multiplied by 1 is the same value as itself. So the question is basically a statement showing that two fractions are equal to each other. The statement is correct so we "answer" the statement by saying that is is true.
12 plus 0 is 12
There is no equation. An equation is true, whereas the statement ( 5 + 7 = -12 ) is false.
To solve the inequality -12 ≤ -12, we first recognize that both sides are equal. This means that the inequality is true when the values are equal. In this case, -12 is indeed equal to -12, so the inequality holds true. In interval notation, this solution is represented as [-12, -12].