operations involving scientific notation
add. write your answer in scientific notation.
1 (7.2×10^5)+(1.54×10^5)
2 (8.41×10^7)+(7.9×10^7)
3 (3.7×10^8)+(4.83×10^9)
subtract. write your answer in scientific notation.
4 (5.31×10^3)-(2.8×10^3)
5 (7.9×10^6)-(7.42×10^6)
6 (8.3×10^5)-(5.6×10^4)
multiply. write your answer in scientific notation.
7 (4.1×10^6)(2.4×10^2)
8 (3.95×10^8)(5.8×10^3)
9 (9.7×10^8)(6×10^11)
divide. write your answer in scientific notation.
10 \frac{7.4×10^8}{4×10^3}
11 \frac{1.9×10^12}{9.5×10^3}
12 \frac{3.84×10^18}{8×10^6}

Question

Accepted Answer

1. **Addition of $(7.2\times 10^{5})+(1.54\times 10^{5})$**:
   - **Explanation**:
     - **Step1: Factor out $10^{5}$**
       - Using the distributive property $a\times c + b\times c=(a + b)\times c$, where $a = 7.2$, $b=1.54$ and $c = 10^{5}$, we have $(7.2 + 1.54)\times10^{5}$.
     - **Step2: Calculate the sum of the coefficients**
       - $7.2+1.54 = 8.74$, so the result is $8.74\times 10^{5}$.
2. **Addition of $(8.41\times 10^{7})+(7.9\times 10^{7})$**:
   - **Explanation**:
     - **Step1: Factor out $10^{7}$**
       - $(8.41 + 7.9)\times10^{7}$.
     - **Step2: Calculate the sum of the coefficients**
       - $8.41+7.9 = 16.31$. Since scientific - notation requires $1\leqslant a<10$, we rewrite $16.31$ as $1.631\times 10^{1}$. Then $(1.631\times 10^{1})\times10^{7}=1.631\times 10^{8}$.
3. **Addition of $(3.7\times 10^{8})+(4.83\times 10^{9})$**:
   - **Explanation**:
     - **Step1: Make the exponents the same**
       - Rewrite $3.7\times 10^{8}$ as $0.37\times 10^{9}$. Then $(0.37\times 10^{9})+(4.83\times 10^{9})=(0.37 + 4.83)\times10^{9}$.
     - **Step2: Calculate the sum of the coefficients**
       - $0.37+4.83 = 5.2$, so the result is $5.2\times 10^{9}$.
4. **Subtraction of $(5.31\times 10^{3})-(2.8\times 10^{3})$**:
   - **Explanation**:
     - **Step1: Factor out $10^{3}$**
       - $(5.31 - 2.8)\times10^{3}$.
     - **Step2: Calculate the difference of the coefficients**
       - $5.31-2.8 = 2.51$, so the result is $2.51\times 10^{3}$.
5. **Subtraction of $(7.9\times 10^{6})-(7.42\times 10^{6})$**:
   - **Explanation**:
     - **Step1: Factor out $10^{6}$**
       - $(7.9 - 7.42)\times10^{6}$.
     - **Step2: Calculate the difference of the coefficients**
       - $7.9-7.42 = 0.48$, so the result is $0.48\times 10^{6}$. Rewriting in proper scientific - notation, we get $4.8\times 10^{5}$.
6. **Subtraction of $(8.3\times 10^{5})-(5.6\times 10^{4})$**:
   - **Explanation**:
     - **Step1: Make the exponents the same**
       - Rewrite $5.6\times 10^{4}$ as $0.56\times 10^{5}$. Then $(8.3\times 10^{5})-(0.56\times 10^{5})=(8.3 - 0.56)\times10^{5}$.
     - **Step2: Calculate the difference of the coefficients**
       - $8.3-0.56 = 7.74$, so the result is $7.74\times 10^{5}$.
7. **Multiplication of $(4.1\times 10^{6})(2.4\times 10^{2})$**:
   - **Explanation**:
     - **Step1: Multiply the coefficients and add the exponents**
       - $(4.1\times2.4)\times10^{6 + 2}$.
     - **Step2: Calculate the product of the coefficients**
       - $4.1\times2.4 = 9.84$, so the result is $9.84\times 10^{8}$.
8. **Multiplication of $(3.95\times 10^{8})(5.8\times 10^{3})$**:
   - **Explanation**:
     - **Step1: Multiply the coefficients and add the exponents**
       - $(3.95\times5.8)\times10^{8 + 3}$.
     - **Step2: Calculate the product of the coefficients**
       - $3.95\times5.8=22.91$. Rewrite $22.91$ as $2.291\times 10^{1}$. Then $(2.291\times 10^{1})\times10^{11}=2.291\times 10^{11}$.
9. **Multiplication of $(9.7\times 10^{8})(6\times 10^{11})$**:
   - **Explanation**:
     - **Step1: Multiply the coefficients and add the exponents**
       - $(9.7\times6)\times10^{8 + 11}$.
     - **Step2: Calculate the product of the coefficients**
       - $9.7\times6 = 58.2$. Rewrite $58.2$ as $5.82\times 10^{1}$. Then $(5.82\times 10^{1})\times10^{19}=5.82\times 10^{19}$.
10. **Division of $\frac{7.4\times 10^{8}}{4\times 10^{3}}$**:
   - **Explanation**:
     - **Step1: Divide the coefficients and subtract the exponents**
       - $\frac{7.4}{4}\times10^{8 - 3}$.
     - **Step2: Calculate the quotient of the coefficients**
       - $\frac{7.4}{4}=1.85$, so the result is $1.85\times 10^{5}$.
11. **Division of $\frac{1.9\times 10^{12}}{9.5\times 10^{3}}$**:
   - **Explanation**:
     - **Step1: Divide the coefficients and subtract the exponents**
       - $\frac{1.9}{9.5}\times10^{12 - 3}$.
     - **Step2: Calculate the quotient of the coefficients**
       - $\frac{1.9}{9.5}=0.2$. Rewrite $0.2$ as $2\times 10^{-1}$. Then $(2\times 10^{-1})\times10^{9}=2\times 10^{8}$.
12. **Division of $\frac{3.84\times 10^{18}}{8\times 10^{6}}$**:
   - **Explanation**:
     - **Step1: Divide the coefficients and subtract the exponents**
       - $\frac{3.84}{8}\times10^{18 - 6}$.
     - **Step2: Calculate the quotient of the coefficients**
       - $\frac{3.84}{8}=0.48$. Rewrite $0.48$ as $4.8\times 10^{-1}$. Then $(4.8\times 10^{-1})\times10^{12}=4.8\times 10^{11}$.

# Answer:
1. $8.74\times 10^{5}$
2. $1.631\times 10^{8}$
3. $5.2\times 10^{9}$
4. $2.51\times 10^{3}$
5. $4.8\times 10^{5}$
6. $7.74\times 10^{5}$
7. $9.84\times 10^{8}$
8. $2.291\times 10^{11}$
9. $5.82\times 10^{19}$
10. $1.85\times 10^{5}$
11. $2\times 10^{8}$
12. $4.8\times 10^{11}$

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