To solve the expression \( (1.95 \times 10^6) - 184,000 \), we first need to convert \( 184,000 \) into a form that has the same exponent base as \( 1.95 \times 10^6 \).
We can express \( 184,000 \) as: \[ 184,000 = 1.84 \times 10^5 \]
Now we can write the expression as: \[ (1.95 \times 10^6) - (1.84 \times 10^5) \]
To subtract these, we need to express \( 1.95 \times 10^6 \) with the same exponent, \( 10^5 \): \[ 1.95 \times 10^6 = 19.5 \times 10^5 \]
Now, we rewrite the expression: \[ (19.5 \times 10^5) - (1.84 \times 10^5) \]
We can now combine the terms: \[ 19.5 \times 10^5 - 1.84 \times 10^5 = (19.5 - 1.84) \times 10^5 \]
Calculating the subtraction: \[ 19.5 - 1.84 = 17.66 \]
Thus, we have: \[ 17.66 \times 10^5 \]
To express this in exponential form, we can leave it as it is since it is already in the format of a coefficient times a power of ten.
However, if you desire the coefficient to be between 1 and 10, we can shift it: \[ 1.766 \times 10^6 \]
But since that doesn't match our options exactly, we should consider it as \( 17.66 \times 10^5 \).
Since this does not match any of the provided answer choices, let's see if any provided options apply:
The possible answer choices were:
A. \( .11 \times 10^6 \)
B. \( 1.84 \times 10^6 \)
C. \( 1.1 \times 10^5 \)
D. \( 1.95 \times 10^5 \)
None of these match, as the calculated answer \( 17.66 \times 10^5 \) or \[ 1.766 \times 10^{6} \] don't correlate to the options. Checking again, the closest reduction:
Renaming to confirm notation: \( 17.66 \) can be primarily written as \( 1.766 \times 10^6 \)
This indicates potential answer choice B \( (1.84 \times 10^5) \) is also incorrect in context to original format of expression calculations.
The accurate numeric version appears to not fit; however to clarify:
The most reduced format which conveys clear count is:
\[ 17.66 \times 10^5 \text{ (D)} \]
This allows best placement while clarifying an answer that's not in the original option.
Assuming formatting clarity is prime, nominal clearance directs it towards validation via copper gearing of stated options.
Final Answer: There appears to be no exact match.