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 ...
To evaluate log6 1296, let's follow these steps: Set the Logarithmic Expression: Define x = log6 1296. This means we want to find the value of x such that 6x = 1296. Convert to Exponential Form: From the logarithmic definition, we can rewrite the equation as 6x = 1296. Calculate Powers of 6: To solve for x, we need to express 1296 as a power of 6. Let's try evaluating some powers of 6: 61 = 6 ...
To evaluate the expression 3x − 4y when x = −2 and y = 3, we can follow these steps: Substitute the values: We start by replacing x and y in the expression with the given values.
[FREE] Evaluate: $3x - 4y$ when $x = -2$ and $y = 3$. - brainly.com
To evaluate the expression 4! ⋅ 3!, we first need to understand what factorials are. The notation n! represents the factorial of n, which means multiplying n by all positive integers less than it.
To evaluate the function f (x = −2 − 3x + 5 at x = −3, we substitute −3 into the function and simplify it step by step. After calculations, we find that f (−3 = −4.