Stephen evaluated (6.34 x 10^-7)(4.5 x 10^3). His work is shown below. Which statements describe his errors? Check all that apply.
(6.34 x 10^-7)(4.5 x 10^3)
(6.34 x 4.5)(10^-7 x 10^3)
28.53 x 10^-4
-28.53 x 10^4
-2.853 x 10^3
A. He changed the sign of the coefficient. A negative exponent does not affect the sign of a coefficient in scientific notation. The sign of the exponent determines the direction the decimal is moved in.

B. He rewrote -28.53 x 10^4 incorrectly; 28.53 x 10^4 = 2.853 x 10^5. The exponent is increased to account for the extra place the decimal is moved.

C. He did not correctly evaluate the exponent. It should be evaluated as (10^-7 x 10^3) = 10^3 since exponents are evaluated using the same operation as the coefficients.

D. He got the wrong value for the coefficients; 28.53 x 10^-4 is not possible. The coefficients in scientific notation are always greater than 1, but less than 10.

F. He multiplied the coefficients; he should have added 6.34 and 4.5. The product of powers rule states that coefficients are added.

Keep in mind that there is multiple answers.

The correct answers to this question are the first option and the second option.

This is because a coefficient in scientific notation should always be positive, while also remain greater than 1 but less than 10.

Additionally, moving a decimal adds the value of an exponent. Hope this helps your question.

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JeanaShupp JeanaShupp · Answer 2 · 2019-03-22T07:44:24+01:00

Answer: A. He changed the sign of the coefficient. A negative exponent does not affect the sign of a coefficient in scientific notation. The sign of the exponent determines the direction the decimal is moved in.

B. He rewrote [tex]-28.53\times10^4[/tex] incorrectly; [tex]28.53\times 10^4 = 2.853\times 10^5[/tex]. The exponent is increased to account for the extra place the decimal is moved.

Step-by-step explanation:

Given expression : [tex](6.34\times10^{-7})(4.5\times10^3)[/tex]

[tex]=(6.34\times 4.5)(10^-7\times10^3)[/tex] [Taking coefficients and exponents separate]

[tex]=28.53\times10^{-7+3}[/tex] [By law of exponent]

[tex]=28.53\times10^{-4}[/tex]

Here he changed the sign of the coefficient. A negative exponent does not affect the sign of a coefficient in scientific notation. The sign of the exponent determines the direction the decimal is moved in.

Convert in scientific form.

[tex]28.53\times10^{-4}=2.853\times10\times10^{-4}\\=2.853\times10^{1-4}\\=2.853\times10^{-3}[/tex]

In the given explanation he rewrote [tex]-28.53\times10^4[/tex] incorrectly; [tex]28.53\times 10^4 = 2.853\times 10^5[/tex]. The exponent is increased to account for the extra place the decimal is moved.

Thus, option A and B express the errors done by Stephen.