Dividing Radicals
(√4) / (2√20)
(√5) / (10)
√2 (√2-3)
2-3√2
3√6 - 4√6
-√6
√75x3
5x√3x
f(x)=5x^3 +1
ƒ⁻¹(x)= (∛25(x-1)) / (5)
(4√2) / (3√5)
(4√10) / (15)
3√12 · √6
18√2
2√5 + 6√5
8√5
√15x9
x4√15x
f(x)= (3) / (x-4)
ƒ⁻¹(x)= (3) / (x + 4)
(√4) / (√36)
1/3
√5 · -4√20
-40
11√28 + √7 + 2√7
88√2 +3√7
√64x4
8x2
f(x)= (3x+4) / (5-4x)
ƒ⁻¹(x)= (5x-4) / (3+4x)
(√18) / (√2)
3
√6 · √9
3√6
√b + 6√2b - 5√b
-4√b + 6√2b
∛18x⁶
x2∛18
f(x)= 9+√4x-4
ƒ⁻¹(x)= (x²)/(4) - (9x)/(2) +(85)/(4)
(√5) / (5 + √2)
(√5+5√2) / 5
3√2 · 5√6
30√3
-3√17 - 4√14
-21- 4√14
∛64z6
4z2
f(x) = (x+3) / (x+7)
ƒ⁻¹(x)= (7x-3)/(1-x)