Certainly! The statements translated into mathematical sentences using the constant of variation \(k\) are as follows:
1. \(P = k \cdot q \cdot r\)
2. \(V = k \cdot I \cdot w \cdot h\)
3. \(A = k \cdot b \cdot h\)
4. \(V = k \cdot h \cdot r^2\)
5. \(H = k \cdot R \cdot I^2\)
6. \(E = k \cdot m \cdot a\)
7. \(V = k \cdot B \cdot h\)
8. \(A = k \cdot b \cdot h\)
9. \(s = k \cdot w \cdot d\)
10. \(V = k \cdot I \cdot R\)
These mathematical sentences represent the joint variation relationships between the given variables, where the constant \(k\) signifies the proportionality among the variables involved in each scenario.
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Answer:
Certainly! The statements translated into mathematical sentences using the constant of variation \(k\) are as follows:
1. \(P = k \cdot q \cdot r\)
2. \(V = k \cdot I \cdot w \cdot h\)
3. \(A = k \cdot b \cdot h\)
4. \(V = k \cdot h \cdot r^2\)
5. \(H = k \cdot R \cdot I^2\)
6. \(E = k \cdot m \cdot a\)
7. \(V = k \cdot B \cdot h\)
8. \(A = k \cdot b \cdot h\)
9. \(s = k \cdot w \cdot d\)
10. \(V = k \cdot I \cdot R\)
These mathematical sentences represent the joint variation relationships between the given variables, where the constant \(k\) signifies the proportionality among the variables involved in each scenario.