Question
Xsquared (4 + 7) / 9,432 x Y multiplied by 768 x 83 = 17
Answers
GPT-4o mini
To solve the equation you provided, let's break it down step by step.
1. **Calculate the value of the expression in parentheses:**
\[
4 + 7 = 11
\]
2. **Substitute back into the equation:**
\[
X^2 \cdot \frac{11}{9432} \cdot Y \cdot 768 \cdot 83 = 17
\]
3. **Multiply the constants:**
\[
768 \cdot 83 = 63624
\]
4. **Now substitute that back in:**
\[
X^2 \cdot \frac{11}{9432} \cdot Y \cdot 63624 = 17
\]
5. **Rearrange to find \(X^2 \cdot Y\):**
\[
X^2 \cdot Y = \frac{17 \cdot 9432}{11 \cdot 63624}
\]
6. **Calculate the right side:**
- First, calculate \(11 \cdot 63624\):
\[
11 \cdot 63624 = 699864
\]
7. **Next calculate \(17 \cdot 9432\):**
\[
17 \cdot 9432 = 160824
\]
8. **Now divide:**
\[
\frac{160824}{699864} \approx 0.230
\]
So the equation simplifies to:
\[
X^2 \cdot Y \approx 0.230
\]
This means \(X^2 \cdot Y\) is approximately 0.230.
1. **Calculate the value of the expression in parentheses:**
\[
4 + 7 = 11
\]
2. **Substitute back into the equation:**
\[
X^2 \cdot \frac{11}{9432} \cdot Y \cdot 768 \cdot 83 = 17
\]
3. **Multiply the constants:**
\[
768 \cdot 83 = 63624
\]
4. **Now substitute that back in:**
\[
X^2 \cdot \frac{11}{9432} \cdot Y \cdot 63624 = 17
\]
5. **Rearrange to find \(X^2 \cdot Y\):**
\[
X^2 \cdot Y = \frac{17 \cdot 9432}{11 \cdot 63624}
\]
6. **Calculate the right side:**
- First, calculate \(11 \cdot 63624\):
\[
11 \cdot 63624 = 699864
\]
7. **Next calculate \(17 \cdot 9432\):**
\[
17 \cdot 9432 = 160824
\]
8. **Now divide:**
\[
\frac{160824}{699864} \approx 0.230
\]
So the equation simplifies to:
\[
X^2 \cdot Y \approx 0.230
\]
This means \(X^2 \cdot Y\) is approximately 0.230.