irrational numbers like 0.01020304...., can be written as a fraction.
false, any decimal that does not terminate or repeat cannot be written as a fraction.
true, decimals that do not terminate can always be written as a fraction
false, any decimal that does not terminate or repeat is rational
true, all decimals can be written as a fraction
false, any decimal that does not terminate or repeat cannot be written as a fraction.
A repeating decimal, like 0.327327327..., can be written as a fraction.
True, a repeating decimal is rational, so can be written as a ratio.
False, any decimal that does not terminate cannot be written as a fraction.
False, any decimal that repeats cannot be written as a fraction.
True, a repeating decimal is irrational, so can be written as a ratio
True, a repeating decimal is rational, so can be written as a ratio.
Rational numbers cannot?
Repeat digits in the decimal
Be square roots of non-perfect squares
Be negative
go on forever and ever
Rational numbers can have repeating digits in the decimal representation, be square roots of non-perfect squares, and be negative. However, rational numbers cannot go on forever and ever in their decimal representation without repeating or terminating.
Solve the equation using the steps: 2 (x+8) = 2x + 8
Step 1: Use the ? property to get ? resulting equation.
Step 2: Use the ? property to get ? resulting equation.
Step 3: There is/are ? solution(s)
Step 1: Use the distributive property to get 2x + 16 = 2x + 8.
Step 2: Use the subtraction property to subtract 2x from both sides of the equation, resulting in 16 = 8.
Step 3: There is no solution to the equation since the equation leads to a contradiction (16 cannot equal 8).