|
- [FREE] Evaluate: \\frac{20}{10-6} = - brainly. com
To evaluate the expression 10−620, follow these steps: Calculate the denominator: First, simplify the expression inside the parentheses You'll subtract 6 from 10: 10− 6 = 4 Substitute the simplified denominator: Now that you've found the denominator, replace it back into the original expression The expression now looks like this: 420 Perform the division: Next, you need to divide 20 by 4
- [FREE] Evaluate: a² − 3b when a = 2 and b = -3 - brainly. com
To evaluate the expression a2 − 3b when a = 2 and b = −3, follow these steps: Substitute the values of a and b: Replace a with 2 and b with -3 in the expression
- [FREE] Evaluate. 2^ {-2} \cdot (12 \cdot 3)-5^3 - brainly. com
To evaluate the expression 2−2 ⋅ (12⋅ 3) − 53, we need to follow the order of operations (often remembered by the acronym PEMDAS: Parentheses, Exponents, Multiplication and Division (from left to right), Addition and Subtraction (from left to right))
- [FREE] Evaluate $x^{-2}$ for $x=-3$. - brainly. com
To evaluate x−2 for x = −3, substitute −3 into the expression and apply the rule for negative exponents This results in (−3)21, which simplifies to 91 Therefore, the final answer is 91
- [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: log1664 a. 1 3 b. 2 3 c. 3 2 - brainly. com
To evaluate log16(64) we first need to express 64 in terms of the base 16 We can rewrite the logarithmic equation: log16(64) = x which means: 16x = 64 Next, let's express both sides using base 2: 16 = 24 and 64 = 26 Putting this into our equation gives us: (24)x = 26 which simplifies to: 24x = 26 Since the bases are the same, we can set the exponents equal to each other: 4x = 6 Solving for x
- [FREE] Evaluate the expression |-31. 889| . - brainly. com
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, disregarding whether the number is positive or negative
- [FREE] Evaluate (0. 01024)^{-2 5}. - brainly. com
To evaluate (0 01024) raised to the power -2 5, use the rule that states any number raised to the power -a is equal to 1 divided by that number raised to the power a
|
|
|