Aug 13, 2025 · To evaluate 83 ÷ −61 ⋅ −56, we first rewrite the division as multiplication by the reciprocal, resulting in 2107. After simplifying the fractions step by step through multiplication …

Mar 30, 2022 · To evaluate the expression ∣ − 31.889∣, we need to understand the concept of absolute value. The absolute value of a number is its distance from zero on the number line, …

May 16, 2025 · The final result of evaluating 26.45+ 4.79+ 120.02− 3.20 is 148.06. We added the first two numbers, then added the next, and finally subtracted the last number. This step-by …

Jun 30, 2023 · To evaluate (43)4, multiply 43 by itself four times to get the fraction in simplest form, which is 25681. To evaluate the expression (43)4, we need to raise the fraction 43 to the …

Oct 31, 2024 · The evaluated expression (2 − 5 (p +q (i when p 2 and q 5 is −21i. Therefore, the correct answer is C. −21i.

Oct 8, 2017 · So, when f (x) = x2, we find that 3f (2) = 12. This process shows how to evaluate a function at a specific point and then multiply that result by a constant. For example, if you had …

Sep 28, 2017 · To evaluate the expression –32 + (2 – 6) (10), we must follow the order of operations, often remembered by the acronym PEMDAS (Parentheses, Exponents, …

Nov 22, 2024 · Evaluate the Parentheses: Next, we look at the expression within the parentheses, (2 −6). Subtract 6 from 2, which results in −4. Multiply with 10: Take the result from the …

May 3, 2025 · Examples & Evidence For example, if you wanted to evaluate more sums like this, you would use the same process: combine numbers in pairs and keep a running total, …

To evaluate the expression 3 −54 ⋅ 3 21, we can use the property of cube roots that states 3 a⋅ 3 b = 3 a⋅ b. Therefore, we can combine the two cube roots into one: