SELECT PAGE NO.
No Books/Pages Are Available |
SELECT PROBLEM NO. FOR THE PAGE |
The series is .
Direct comparision test :
Let for all .
1. If converges, then converges.
2. If diverges, then diverges.
Consider .
The series is compared with .
for all .
The series is in the form of geometric series with .
, the series is convergent by geometric sereis test.
Therefore, is convergent by direct comparison method.
The series is converges.
The series is converges.
"I want to tell you that our students did well on the math exam and showed a marked improvement that, in my estimation, reflected the professional development the faculty received from you. THANK YOU!!!" June Barnett |
"Your site is amazing! It helped me get through Algebra." Charles |
"My daughter uses it to supplement her Algebra 1 school work. She finds it very helpful." Dan Pease |