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-step approach helps ensure accuracy in calculation.
To evaluate the expression 9 we can rewrite the exponent: Recognize that raising a number to the power of 23 is equivalent to taking the square root of the number and then raising the result to the power of 3. This can be expressed as: 9 =. Next, we calculate the square root of 9: 9 = 9 = 3. Finally, raise 3 to the power of 3: = 33 = 27. Thus, the final result is 9 = 27.
The term 'evaluate' means to assess the strength or effectiveness of something. It is commonly used in various contexts, including education and literature. Understanding how to evaluate involves analyzing and determining the value or quality of the subject in question.
To evaluate (8 + t) to the third power - 6 when t = 2, you first replace the variable t with the number 2 and then perform the operations in the correct order, according to the order of operations (PEMDAS/BODMAS).
The word 'evaluate' means to assess the strength or effectiveness of something, often involving critical analysis. In contexts like English, evaluating requires understanding and analyzing the elements of a subject to form a judgment. The correct answer from the provided options is B. to assess the strength or effectiveness of something.
To evaluate the expression 2l +2w for the values l = 5.7 and w = 6.2, we can follow these steps: Substitute the Values: Replace l and w in the expression with their given values:
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:
To evaluate 4 81, we first need to recognize what this expression means. The fourth root of a number is the value that, when multiplied by itself four times, gives that number.
We are asked to evaluate the expression 3∣ − 5∣ −2∣ − 2∣. This involves absolute values and basic arithmetic operations. Let's break it down step by step. Evaluating Absolute Values First, we need to evaluate the absolute values. The absolute value of a number is its distance from zero. So, ∣ − 5∣ = 5 and ∣− 2∣ = 2.
To evaluate the expression –32 + (2 – 6) (10), we must follow the order of operations, often remembered by the acronym PEMDAS (Parentheses, Exponents, Multiplication and Division, Addition and Subtraction). Firstly, we calculate the value inside the parentheses (2 – 6), which equals –4. Then we multiply this value by 10 to get –40.
