Question
Which of the following statements show correct ways to find 7×198
? Select all that apply.
(1 point)
Responses
7×198=(7×200)+(7×2)
7 × 198 = 7 × 200 + 7 × 2
7×198=(7×200)−(7×2)
7 × 198 = 7 × 200 - 7 × 2
7×198=(7+100)×(7+90)×(7+8)
7 × 198 = 7 + 100 × 7 + 90 × 7 + 8
7×198=(7×100)×(7×90)×(7×8)
7 × 198 = 7 × 100 × 7 × 90 × 7 × 8
7×198=(7×100)+(7×90)+(7×8)
? Select all that apply.
(1 point)
Responses
7×198=(7×200)+(7×2)
7 × 198 = 7 × 200 + 7 × 2
7×198=(7×200)−(7×2)
7 × 198 = 7 × 200 - 7 × 2
7×198=(7+100)×(7+90)×(7+8)
7 × 198 = 7 + 100 × 7 + 90 × 7 + 8
7×198=(7×100)×(7×90)×(7×8)
7 × 198 = 7 × 100 × 7 × 90 × 7 × 8
7×198=(7×100)+(7×90)+(7×8)
Answers
Answered by
GPT-4o mini
To determine which statements show correct ways to find \( 7 \times 198 \), let’s analyze each option:
1. **\( 7 \times 198 = (7 \times 200) + (7 \times 2) \)**: This is incorrect because it's actually using a wrong addition. It should be \( 7 \times 198 = (7 \times 200) - (7 \times 2) \) since \( 198 \) is actually \( 200 - 2 \).
2. **\( 7 \times 198 = 7 \times 200 - 7 \times 2 \)**: This is correct. This applies the distributive property correctly.
3. **\( 7 \times 198 = (7 + 100)(7 + 90)(7 + 8) \)**: This is incorrect because you cannot apply the distributive property in this manner to express \( 7 \times 198 \).
4. **\( 7 \times 198 = (7 \times 100)(7 \times 90)(7 \times 8) \)**: This is incorrect and does not logically follow from the calculations of \( 7 \times 198 \).
5. **\( 7 \times 198 = (7 \times 100) + (7 \times 90) + (7 \times 8) \)**: This is incorrect because it does not correctly apply the distributive property or the multiplication of \( 7 \times 198 \).
Thus, the only correct way to find \( 7 \times 198 \) from the options given is:
- \( 7 \times 198 = 7 \times 200 - 7 \times 2 \)
**Final Answer**:
Select: \( 7 \times 198 = (7 \times 200) - (7 \times 2) \) only.
1. **\( 7 \times 198 = (7 \times 200) + (7 \times 2) \)**: This is incorrect because it's actually using a wrong addition. It should be \( 7 \times 198 = (7 \times 200) - (7 \times 2) \) since \( 198 \) is actually \( 200 - 2 \).
2. **\( 7 \times 198 = 7 \times 200 - 7 \times 2 \)**: This is correct. This applies the distributive property correctly.
3. **\( 7 \times 198 = (7 + 100)(7 + 90)(7 + 8) \)**: This is incorrect because you cannot apply the distributive property in this manner to express \( 7 \times 198 \).
4. **\( 7 \times 198 = (7 \times 100)(7 \times 90)(7 \times 8) \)**: This is incorrect and does not logically follow from the calculations of \( 7 \times 198 \).
5. **\( 7 \times 198 = (7 \times 100) + (7 \times 90) + (7 \times 8) \)**: This is incorrect because it does not correctly apply the distributive property or the multiplication of \( 7 \times 198 \).
Thus, the only correct way to find \( 7 \times 198 \) from the options given is:
- \( 7 \times 198 = 7 \times 200 - 7 \times 2 \)
**Final Answer**:
Select: \( 7 \times 198 = (7 \times 200) - (7 \times 2) \) only.
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