1. z = 162 when x = 6 and y = 9 in joint variation. 2. d is 48 for e = 4 and f = 6 in joint variation. 3. In combined variation, a = 21 for b=35 and c=5. 4. d = 28 5. g = 36.
How to solve variation equations?
1. Using the joint variation formula, z = kxy, where k is the constant of variation:
45 = k × 3 × 5
Solving for k, k = 3. Now, for x = 6 and y = 9:
z = 3 × 6 × 9
z = 162
2. Using the joint variation formula, d = kef, where k is the constant of variation:
100 = k × 2 × 25
Solving for k, k = 2. Now, for e = 4 and f = 6:
d = 2 × 4 × 6
d = 48.
3. Using the combined variation formula,
, where k is the constant of variation:
![\[18 = (k \cdot 24)/(4)\]](https://img.qammunity.org/2024/formulas/mathematics/high-school/hyhv21tttf0voppcjwqrjdu9377ztw8au6.png)
Solving for k, k = 3. Now, for b = 35 and c = 5:
![\[a = (3 \cdot 35)/(5) = 21.\]](https://img.qammunity.org/2024/formulas/mathematics/high-school/38c7djp0hwzorxsshqhyrjvynxxr2wdtl6.png)
4. Using the combined variation formula,
, where \(k\) is the constant of variation:
![\[21 = (k \cdot 27)/(9)\]](https://img.qammunity.org/2024/formulas/mathematics/high-school/h0uif39kedmhy2rqs21rx60b6ckk0r2dke.png)
Solving for k, k = 7. Now, for e = 32 and f = 8:
![\[d = (7 \cdot 32)/(8) = 28.\]](https://img.qammunity.org/2024/formulas/mathematics/high-school/nppu8gm26p93dvfhdj4yoojk3g0gqg67j8.png)
5. Using the combined variation formula,
, where k is the constant of variation:
![\[48 = (k \cdot 36)/(3)\]](https://img.qammunity.org/2024/formulas/mathematics/high-school/bl2i4u5bmui9t1cla9eotghe3sj0hpuub1.png)
Solving for k, k = 4. Now, for h = 18 and i = 2:
![\[g = (4 \cdot 18)/(2) = 36.\]](https://img.qammunity.org/2024/formulas/mathematics/high-school/wmsww9etj096cvjc5g947nfgyc04qca5sl.png)