What is the sixth term of the sequence defined by a_n = 2^n/n^2, rounded to the nearest tenth?

Unlock all questions

This demo includes only 20 questions. Upgrade to access hundreds of questions, flashcards, exam simulations, and disable ads.

Full question bankExam simulationsFlashcards

Prepare for the Academic Team Math Test with our comprehensive quizzes. Master complex problems with flashcards and multiple-choice questions, each featuring detailed hints and explanations. Ace your exam and boost your math skills!

Multiple Choice

To find the sixth term of the sequence defined by ( a_n = \frac{2^n}{n^2} ), substitute ( n = 6 ) into the expression.

Calculating ( a_6 ):

[

a_6 = \frac{2^6}{6^2}

]

First, calculate ( 2^6 ):

[

2^6 = 64

]

Next, compute ( 6^2 ):

[

6^2 = 36

]

Now substitute these values back into the expression for ( a_6 ):

[

a_6 = \frac{64}{36}

]

To simplify ( \frac{64}{36} ), both the numerator and the denominator can be divided by 4:

[

a_6 = \frac{16}{9}

]

Now, we can convert ( \frac{16}{9} ) into a decimal:

[

\frac{16}{9} \approx 1.777...

]

When rounding to the nearest tenth, ( 1.777... ) rounds to ( 1.8 ).

Therefore, the sixth term of the sequence, rounded to