evaluate the algebraicexpression calculator represents a topic that has garnered significant attention and interest. [FREE] Evaluate: 26.45 + 4.79 + 120.02 - 3.20. 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.
Additionally, this step-by-step approach helps ensure accuracy in calculation. [FREE] Evaluate (2-5)(p+q)(i) when p=2 and q=5. This perspective suggests that, the evaluated expression (2 − 5)(p +q)(i) when p = 2 and q = 5 is −21i. Therefore, the correct answer is C. [FREE] Evaluate (8 + t)^3 - 6 when t = 2.
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: -32 + (2 - 6)(10) - brainly.com. 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. Building on this, then we multiply this value by 10 to get –40.
[FREE] Evaluate: n^2-3n+8 - brainly.com. To evaluate the expression n2 −3n + 8, we first recognize that this is a quadratic expression in terms of the variable n. This perspective suggests that, understanding the Expression The expression is composed of three terms: The first term is n2, which is the variable n raised to the power of 2. The second term is −3n, which is a linear term involving n.
The third term is +8, which is a constant. The value of the expression 2(4 + 8)(6 −3) is 72. This step-by-step approach leads us to the final answer of 72.
It's important to note that, [FREE] Evaluate -3^2 + (2 - 6) (10). For instance, try evaluating the expression −42 + (3 − 5)(6). By following the same steps of handling the exponent, calculating inside the parentheses, and performing the arithmetic, you can find the solution methodically.
[FREE] Evaluate: \sqrt [3] {-54} \cdot \sqrt [3] {\dfrac {1} {2 .... Moreover, 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. Moreover, therefore, we can combine the two cube roots into one: 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, adjusting as needed when subtracting.
In relation to this, this solution follows basic arithmetic rules and calculations can be verified using a calculator or arithmetic checks. [FREE] Evaluate (mn)(x) for x = -3. (mn)(-3) = - brainly.com.
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