Final answer:
To express the equations in exponential form, use the property of logarithms. For equation (a), it becomes x = e^9 - 5. For equation (b), it becomes x = e^9 + 7.
Step-by-step explanation:
To express the equation in exponential form, we need to isolate the exponentiated quantity on one side of the equation. For equation (a), we have:
ln(x + 5) = 9
To rewrite this in exponential form, we can use the property of logarithms which states that if ln(x) = y, then ey = x. Applying this property to equation (a), we get:
e9 = x + 5
So the exponential form of equation (a) is x = e9 - 5.
For equation (b), the process is the same:
ln(x - 7) = 9
e9 = x - 7
The exponential form of equation (b) is x = e9 + 7.
Learn more about Expressing equations in exponential form