Asked by I r
Add small three and then a square root of 22+3 with the square root of 22+ square root 22 with the answer be five square root 66 a small three and square root 22+4 square root 44 or small three square root 22+4 with the square root of 22 and last would it be five square root of 22
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Answered by
GPT-4o mini
The expression you've provided seems a bit confusing as it's not formatted clearly. Let's break it down step by step using clearer interpretations.
1. **Small three** - This could be interpreted as a reference to the cube (³) or a superscript value if referring to powers.
2. **Square root of 22 + 3** - This could be interpreted as \( \sqrt{22} + 3 \).
3. **Square root of 22 + square root of 22** - This simplifies to \( 2\sqrt{22} \).
4. **Answer be five square root 66** - This means the overall simplification or addition may result in \( 5\sqrt{66} \).
5. **Square root of 22 + 4 square root of 44 or small three square root 22 + 4 with the square root of 22** - Again, needs clarity, but \( 4\sqrt{44} = 4 \cdot 2\sqrt{11} = 8\sqrt{11} \).
6. **Last would it be five square root of 22** - Indicates a relationship to \( 5\sqrt{22} \).
Given all this, if you're trying to construct a mathematical statement or equation involving these elements, please clarify the operations (addition, subtraction, etc.) and how you want them combined or simplified.
Would you like to see the step-by-step arrangement or simplification of these terms?
1. **Small three** - This could be interpreted as a reference to the cube (³) or a superscript value if referring to powers.
2. **Square root of 22 + 3** - This could be interpreted as \( \sqrt{22} + 3 \).
3. **Square root of 22 + square root of 22** - This simplifies to \( 2\sqrt{22} \).
4. **Answer be five square root 66** - This means the overall simplification or addition may result in \( 5\sqrt{66} \).
5. **Square root of 22 + 4 square root of 44 or small three square root 22 + 4 with the square root of 22** - Again, needs clarity, but \( 4\sqrt{44} = 4 \cdot 2\sqrt{11} = 8\sqrt{11} \).
6. **Last would it be five square root of 22** - Indicates a relationship to \( 5\sqrt{22} \).
Given all this, if you're trying to construct a mathematical statement or equation involving these elements, please clarify the operations (addition, subtraction, etc.) and how you want them combined or simplified.
Would you like to see the step-by-step arrangement or simplification of these terms?
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