Deck 8: Quadratic Equations and Functions

Write the first four terms of the sequence whose general term is given.
$$a _ { n } = 2 n - 1$$

Write the first four terms of the sequence whose general term is given.
$$\mathrm { a } _ { \mathrm { n } } = \frac { ( - 1 ) ^ { \mathrm { n } + 1 } } { \mathrm { n } + 8 }$$

Write the first four terms of the sequence whose general term is given.
$$a _ { n } = 2 n$$

Write the first four terms of the sequence whose general term is given.
$$a _ { n } = \frac { ( n - 1 ) ! } { n ^ { 4 } }$$

Write the first four terms of the sequence whose general term is given.
$$a _ { n } = \frac { n + 2 } { 2 n - 1 }$$

Write the first four terms of the sequence whose general term is given.
$$a _ { n } = ( - 1 ) ^ { n + 1 } ( n + 9 )$$

Write the first four terms of the sequence whose general term is given.
$$a _ { n } = \frac { 4 } { n ^ { 2 } }$$

Write the first four terms of the sequence whose general term is given.
$$\mathrm { a } _ { \mathrm { n } } = \left( \frac { 2 } { 3 } \right) ^ { \mathrm { n } }$$

Write the first four terms of the sequence whose general term is given.
$$a _ { n } = \frac { n ^ { 2 } } { ( n - 1 ) ! }$$

Write the first four terms of the sequence whose general term is given.
$$a _ { n } = 2 ( 2 n - 3 )$$

Write the first four terms of the sequence whose general term is given.
$$a _ { n } = - 4 ( n + 1 ) !$$

Write the first four terms of the sequence whose general term is given.
$$a _ { n } = \left( - \frac { 3 } { 4 } \right) ^ { n }$$

Write the first four terms of the sequence whose general term is given.
$$a _ { n } = n - 4$$

Write the first four terms of the sequence whose general term is given.
$$a _ { n } = 3 ^ { n }$$

Write the first four terms of the sequence whose general term is given.
$$a _ { n } = ( - 2 ) ^ { n }$$

Write the first four terms of the sequence whose general term is given.
$$a _ { n } = ( - 1 ) ^ { n } ( n + 2 )$$

Write the first four terms of the sequence whose general term is given.
$$a _ { n } = n ^ { 2 } - n$$

Find the indicated sum.
$$\sum _ { i = 1 } ^ { 4 } 2 ^ { i }$$

Express the sum using summation notation. Use 1 as the lower limit of summation and i for the index of summation.
$$6 ^ { 2 } + 12 ^ { 3 } + 18 ^ { 4 } + \ldots + 48 ^ { 9 }$$

Write the first four terms of the sequence whose general term is given.
$$a _ { n } = \frac { - 4 ( n + 1 ) ! } { n ! }$$

Find the indicated sum.
$$\sum _ { k = 2 } ^ { 4 } \mathrm { k } ( \mathrm { k } + 11 )$$

Express the sum using summation notation. Use 1 as the lower limit of summation and i for the index of summation.
$$2 + 8 + 18 + \ldots + 72$$

Find the indicated sum.
$$\sum _ { i = 2 } ^ { 5 } ( 3 i - 2 )$$

Find the indicated sum.
$$\sum _ { i = 3 } ^ { 8 } 12$$

Find the indicated sum.
$$\sum _ { i = 1 } ^ { 5 } ( i - 10 )$$

Express the sum using summation notation. Use 1 as the lower limit of summation and i for the index of summation.
$$a + 1 + \frac { a + 2 } { 2 } + \ldots + \frac { a + 6 } { 6 }$$

Find the indicated sum.
$$\sum _ { i = 1 } ^ { 5 } \frac { ( - 1 ) ^ { \mathrm { i } + 1 } } { ( \mathrm { i } + 2 ) ! }$$

Find the indicated sum.
$$\sum _ { i = 3 } ^ { 5 } \left( i ^ { 2 } - 5 \right)$$

Find the indicated sum.
$$\sum _ { i = 3 } ^ { 6 } \frac { i ! } { ( i - 1 ) ! }$$

Express the sum using summation notation. Use 1 as the lower limit of summation and i for the index of summation.
$$\frac { 1 } { 3 } + \frac { 1 } { 2 } + \frac { 3 } { 5 } + \ldots + \frac { 6 } { 7 }$$

Express the sum using summation notation. Use 1 as the lower limit of summation and i for the index of summation.
$$3 + 6 + 9 + \ldots + 27$$

Find the indicated sum.
$\sum _ { i = 4 } ^ { 7 } 8 i$

Find the indicated sum.
$$\sum _ { i = 1 } ^ { 5 } \frac { ( \mathrm { i } - 1 ) ! } { ( \mathrm { i } + 1 ) ! }$$

Find the indicated sum.
$$\sum _ { k = 1 } ^ { 4 } ( - 1 ) ^ { k } ( k + 13 )$$

Find the indicated sum.
$$\sum _ { i = 1 } ^ { 4 } \frac { 1 } { 6 i }$$

Find the indicated sum.
$$\sum _ { i = 6 } ^ { 9 } \frac { 1 } { i - 1 }$$

Find the indicated sum.
$$\sum _ { i = 1 } ^ { 4 } \left( - \frac { 1 } { 2 } \right) ^ { i }$$

Express the sum using summation notation. Use a lower limit of summation, not necessarily 1, and k for the index of summation.
$$15 + 19 + 23 + 27 + \ldots + 47$$

Write the first five terms of the arithmetic sequence with the given first term, a1, and common difference, d.
$$a _ { 1 } = \frac { 7 } { 2 } , d = \frac { 5 } { 2 }$$

Solve the problem.
The finite sequence whose general term is an = 0.13n2 - 1.09n + 7.03, where n = 1, 2, 3, . . ., 9 models the total operating costs, in millions of dollars, for a company for nine consecutive years. Find $\sum _ { \mathrm { i } = 1 } ^ { 4 } \mathrm { a } _ { \mathrm { i } }$

Express the sum using summation notation. Use a lower limit of summation, not necessarily 1, and k for the index of summation.
$$( a + 1 ) + ( a + b ) + \left( a + b ^ { 2 } \right) + \ldots + \left( a + b ^ { n } \right)$$

Write the first five terms of the arithmetic sequence with the given first term, a1, and common difference, d.
$$a _ { 1 } = - 0.4 , d = 0.7$$

Express the sum using summation notation. Use a lower limit of summation, not necessarily 1, and k for the index of summation.
$$4 + \frac { 9 } { 2 } + 5 + \frac { 11 } { 2 } + \ldots + \frac { 17 } { 2 }$$

Solve the problem.
The bar graph below shows a company's yearly profits from 2003 to 2011. Let an represent the company's profit, in millions, in year n, where n = 1 corresponds to 2003, n = 2 corresponds to 2004, and so on.
Find $\sum _ { \mathrm { i } = 1 } ^ { 8 } \mathrm { a } _ { \mathrm { i } }$

Write the first five terms of the arithmetic sequence with the given first term, a1, and common difference, d.
$$\mathrm { a } _ { 1 } = - 28 ; \mathrm { d } = 6$$

Express the sum using summation notation. Use a lower limit of summation, not necessarily 1, and k for the index of summation.
$$8 + 9 + 10 + 11 + \ldots + 32$$

Express the sum using summation notation. Use 1 as the lower limit of summation and i for the index of summation.
$a + a r + a r ^ { 2 } + \ldots + a r ^ { 10 }$

Express the sum using summation notation. Use a lower limit of summation, not necessarily 1, and k for the index of summation.
$$1 ^ { 5 } + 2 ^ { 5 } + 3 ^ { 5 } + \ldots + 7 ^ { 5 }$$

Express the sum using summation notation. Use a lower limit of summation, not necessarily 1, and k for the index of summation.
$$\frac { 3 } { 4 } + \frac { 4 } { 5 } + \frac { 5 } { 6 } + \frac { 6 } { 7 } + \ldots + \frac { 17 } { 18 }$$

Express the sum using summation notation. Use a lower limit of summation, not necessarily 1, and k for the index of summation.
$$a + a r + a r ^ { 2 } + \ldots + a r ^ { 15 }$$

Write out the first three terms and the last term of the arithmetic sequence.
$$\sum _ { i = 1 } ^ { 70 } - 2 i$$

Write out the first three terms and the last term of the arithmetic sequence.
$$\sum _ { i = 1 } ^ { 12 }$$

Solve the problem.
To train for a race, Will begins by jogging 11 minutes one day per week. He increases his jogging time by 6 minutes each week. Write the general term of this arithmetic sequence, and find how many weeks it takes for him to reach a jogging time of one hour. A) $a _ { n } = 6 n + 11 ; 9$ weeks
B) $a _ { n } = 6 n + 5 ; 9$ weeks
C) $a _ { n } = 6 n + 5 ; 10$ weeks
D) $a _ { n } = 6 n + 11 ; 10$ weeks

Use the formula for the sum of the first n terms of an arithmetic sequence to find the indicated sum.
$$\sum _ { i = 1 } ^ { 26 } ( - 3 i + 8 )$$

Use the formula for the general term (the nth term) of an arithmetic sequence to find the indicated term of the sequence with the given first term, a1, and common difference, d.
Find a 37 when $a _ { 1 } = 5 , d = \frac { 2 } { 3 }$ .

Use the formula for the sum of the first n terms of an arithmetic sequence to find the indicated sum.
$$\sum _ { \mathrm { i } = 1 } ^ { 49 } ( 5 \mathrm { i } + 5 )$$

Use the formula for the general term (the nth term) of an arithmetic sequence to find the indicated term of the sequence with the given first term, a1, and common difference, d.
$$a _ { 1 } = - \frac { 3 } { 5 } , d = \frac { 4 } { 5 }$$

Use the formula for the general term (the nth term) of an arithmetic sequence to find the indicated term of the sequence with the given first term, a1, and common difference, d.
$$a _ { 1 } = - 9 , d = - 0.5$$

Use the formula for the sum of the first n terms of an arithmetic sequence to find the indicated sum.
$$\sum _ { i = 1 } ^ { 27 } ( 6 i - 1 )$$

Solve the problem.
Jacie is considering a job that offers a monthly starting salary of $3500 and guarantees her a monthly raise of $110 during her first year on the job. Find the general term of this arithmetic sequence and her monthly salary at the end of her first year. A) $a _ { n } = 3390 + 110 n$ ; $\$ 4710$
B) $a _ { n } = 3500 + 110 n ; \$ 4820$
C) $a _ { n } = 3500 + 110 n ; \$ 4710$
D) $a _ { n } = 3390 + 110 ( n - 1 ) ; \$ 4600$