QUESTION IMAGE
Question
question 4
find the sum of ((6.21 \times 10^8) + (4.86 \times 10^8)).
(1.107 \times 10^{10})
(5.481 \times 10^9)
(6.696 \times 10^9)
(1.107 \times 10^9)
question 5
simplify: ((9.42 \times 10^{-19})(3.04 \times 10^{-4}))
(2.86 \times 10^{-23})
(28.6 \times 10^{-23})
(28.6 \times 10^{-29})
(2.86 \times 10^{-24})
question 6
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Question 4
Step1: Rewrite to same exponent
Rewrite $6.21 \times 10^8$ as $0.621 \times 10^9$
Step2: Add the coefficients
$(0.621 + 4.86) \times 10^9$
Step3: Calculate sum
$5.481 \times 10^9$ → Correction: Rewrite $4.86 \times 10^9$ as $48.6 \times 10^8$
Step1 (corrected): Match exponents
$6.21 \times 10^8 + 48.6 \times 10^8$
Step2 (corrected): Sum coefficients
$(6.21 + 48.6) \times 10^8 = 54.81 \times 10^8$
Step3 (corrected): Standard form
$5.481 \times 10^9$ → Correction: $4.86 \times 10^9 + 0.621 \times 10^9 = (4.86+0.621)\times10^9=5.481\times10^9$. No, original options: D is $1.107\times10^9$. Recheck: $(6.21+4.86)\times10^8=11.07\times10^8=1.107\times10^9$. Yes!
Step1: Match exponents (correct)
$6.21 \times 10^8 + 4.86 \times 10^8$
Step2: Sum coefficients
$(6.21 + 4.86) \times 10^8 = 11.07 \times 10^8$
Step3: Convert to standard form
$1.107 \times 10^9$
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Question 5
Step1: Multiply coefficients
$9.42 \times 3.04 \approx 28.6$
Step2: Add exponents
$10^{-10} \times 10^{-4} = 10^{-10-4} = 10^{-14}$
Step3: Combine and standardize
$28.6 \times 10^{-14} = 2.86 \times 10^{-13}$
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Question 4: D. $1.107 \times 10^9$
Question 5: A. $2.86 \times 10^{-13}$