SOLUTION: If a sequence is defined recursively by g(0)=2 and g(t+1)=3 g(t)-5 for t is greater than or equal to 0, then g(3) is equal to what value?
Algebra.Com
Question 957085: If a sequence is defined recursively by g(0)=2 and g(t+1)=3 g(t)-5 for t is greater than or equal to 0, then g(3) is equal to what value?
Answer by Fombitz(32388) (Show Source): You can put this solution on YOUR website!
.
.
.
.
.
.
.
RELATED QUESTIONS
If a sequence is defined recursively by g(3)= -2 and g(t+1)= -2g(t)-4 for t is less than... (answered by Fombitz)
If a sequence is defined recursively by k(0)=2 and k(x+1) = 3k(x)-5 for x is greater than (answered by stanbon)
If a sequence is defined recursively by f(0)=2 and f(n+1)=-2f(n)+3 for n>or=0
then f(2)... (answered by greenestamps)
if f=3/g, where g is not equal to 0 and f is not equal to 1, which of the following is... (answered by math_tutor2020,greenestamps,josgarithmetic)
The sequence an is defined recursively by the rules a0 = 0, a1 = 3, and for n is greater... (answered by davethejackal)
2. If a sequence is defined recursively by f(0)=2 and f(n+1)=-2f(n)+3 for n≥0 then (answered by MathLover1)
You MUST show all your steps to earn full points
For what values of h is the function... (answered by Alan3354)
Suppose that the function g is defined, for all real numbers, as follows.... (answered by Fombitz)
If g(t) = log(25-5t)-3
a) Find g(5)
b) Solve g(t) =... (answered by Alan3354)