Final answer:
Using the recurrence relation an= 3an-1 + 4 and the initial condition a1 = 7, the value of a4 is calculated step by step to be 241.
Step-by-step explanation:
To find the value of a4, we use the given recurrence relation an= 3an-1 + 4, with the initial value a1 = 7. Starting with n=2, we can find the subsequent terms up to n=4.
- For n=2: a2 = 3a1 + 4 = 3(7) + 4 = 21 + 4 = 25.
- For n=3: a3 = 3a2 + 4 = 3(25) + 4 = 75 + 4 = 79.
- For n=4: a4 = 3a3 + 4 = 3(79) + 4 = 237 + 4 = 241.
Therefore, the value of a4 is 241.