- [FREE] Evaluate: 26. 45 + 4. 79 + 120. 02 - 3. 20. Show your work . . .
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
- [FREE] Evaluate (8 + t)^3 - 6 when t = 2. - brainly. com
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)
- [FREE] Evaluate: 2 (4+8) (6-3) - brainly. com
The value of the expression 2 4 8 6 3 is 72 First, we calculate the values inside the parentheses, then multiply those results, and finally, multiply by 2 This step-by-step approach leads us to the final answer of 72
- What is the definition of the word evaluate? - Brainly. com
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
- [FREE] Evaluate -3^2 + (2 - 6) (10). - brainly. com
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 previous step, −4, and multiply it by 10 This gives us −4 ×10 = −40 Combine the Results: Now, we add the results from step 1 and step 3 Therefore, −9+ (−40
- [FREE] Evaluate $\\sqrt[4]{81}$ - brainly. com
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
- [FREE] Evaluate: \sqrt [3] {-54} \cdot \sqrt [3] {\dfrac {1} {2 . . .
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:
- [FREE] Evaluate (64)^{-1 3}. - brainly. com
We want to evaluate: (64)−1 3 Step 1: Rewrite the expression using the definition of a negative exponent Recall that for any nonzero number a, a−n = an1 Thus, (64)−1 3 = 641 31 Step 2: Evaluate 641 3, which is the cube root of 64 Since 43 = 64, it follows that 641 3 = 4 Step 3: Substitute the cube root value back into the expression:
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