1. Which of the following describes the graph of the function y =+ 2?

A. a line with slope 3 and y -intercept 2

B. a line with slope

and y -intercept 2

C. a rational function with asymptotes at x = 0 and y = 2

D. a rational function with asymptotes at x = −3 and y = −2

2.

The graph of y =

is translated down 3 units. What is the equation of the new graph?

A. y =

B. y =

C. y =

+3

D. y =

–3

3. An area of a rectangle is 4b 3 + 5b – 3 in 2. The width of the rectangle is 2b – 1 in. What is

the length of the rectangle?

2

A. 2b – b – 3

2

B. 4b + b + 3

2

C. 2b + b + 3

2

D. 2b + 5b + 3

4. Which statement does not describe the graph of y =

?

A. The function is undefined when x = 3, so it has a vertical asymptote at x = 3.

B. The graph has an axis of symmetry.

C. The graph has a horizontal asymptote at y = 2.

D. The graph crosses the y -axis at

.

5. Which of the following expressions simplifies to −1?

A.

B.

C.

D.

6.

Simplify

.

A.

B.

C.

D.

7. Which of the following expressions is in simplest form?

A.

B.

C.

D.

8.

Which values of x are NOT in the domain of

A. −1 and 3

B. 1 and −3

C. 2 and 5

D. −2 and −5

?

9. Add:

+

A.

B.

C.

D.

10.

Simplify (2x – 5) •

.

A. 1

B.

C.

D.

11.

Simplify

A. −3

B.

C.

D.

÷

.

12.

2

÷ (2r – 2)?

Which expression is equivalent to

2

(r – 1)

A.

B.

C.

D.

13.

Which cannot be the first step in multiplying

•

A. Multiply the numerators.

B. Find the reciprocal of

.

C. Factor each polynomial.

D. Multiply the denominators.

14. Which of the following expressions equals (3x 3 – 4x – 1) ÷ (x + 1)?

2

A. 3x – 3x – 7 +

2

B. 3x – 3x – 7 –

2

C. 3x – 3x – 1

2

D. 3x – 7x + 8

15. What is the remainder when x 2 – 4 is divided by x – 3?

A. −13

B. 5

C.

D.

?

16. Which of the following must be true for (x 2 + 2x + 1) ÷ (x + 3)?

A. The remainder is negative.

B. The dividend is in standard form.

C. The remainder is negative and the dividend is in standard form.

D. The dividend is in standard form and the quotient is larger than the divisor for positive

values of x .

17. Subtract

.

A. −2

B.

C.

D.

18. What is the least common denominator of

A. x + 1

B. x – 1

2

C. x – 1

2

D. (x – 1)(x – 1)

19. Add:

+

A.

B.

C.

D.

?

20. Which is the solution of

+

=

?

A. −4

B. −2

C. 2

D. 4

21. Solve

=

.

A. 3, 4

B. 1, 3

C. −1, 2

D. no solution

22. What is the least common denominator of

,

, and

?

A. 2x

B. 3x

C. 6x

D. 6x

2

23. Which equation of inverse variation includes the point (2, 2)?

A. xy = 0

B. xy = 4

C. xy = 2

D. xy = −4

24. Which equation of inverse variation includes the point (−8, −4)?

A. xy = −12

B. xy = 2

C. xy = −32

D. xy = 32

25. What is the excluded value for this rational function: f (x ) =

?

A. 5

B. −19

C. −5

D. 0

26. What is the excluded value for this rational function: y =

A. −1.5

B. 0

C. 1.5

D. 2

?

27. Graph this function: y =

A.

B.

C.

D.

28. Graph this function: y =

A.

B.

C.

D.

29. Graph this function: f (x ) =

A.

B.

C.

D.

+3

30. Simplify, state any excluded values:

A. 2, p ≠ 0

B. 2, p ≠ 5

C. 3, p ≠ 3

D. 6, p ≠ 5

31. Simplify, state any excluded values:

A. (n – 1), n ≠ 4

B. (n + 5), n ≠ 5

C. (n – 1), n ≠ −5

D. , n ≠ −5

32. Multiply: •

A.

B.

C.

D.

33. Divide: ÷

A.

B.

C.

D.

34. Divide: (12x 4 + 9x 3 – 10x 2) ÷ 3x 3

A. 9x + 6 –

B. 4x + 3 –

C. 4x + 3 +

2

D. 4x + 3x – 10

35. Divide: (4x 4 – 6x 3 – 2x 2 – 2x ) ÷ (2x – 1)

3

2

3

2

3

2

3

2

A. 2x – 4x – 1

B. 2x – 3x – x – 1

C. 2x – 2x – 2x – 2 –

D. 2x – 2x – 2x – 2 +

36. Find the LCD of this pair of expressions: ,

A. 3h

B. h

C. 3

D. 3h

2

37. Find the LCD of this pair of expressions: ,

3 7

A. 9a b

B. 9ab

C. 9ab

3

2 4

D. 9a b

38. Add: +

A.

B.

C.

D.

39. Subtract: –

A.

B.

C.

D.

40. Solve this equation: + =

A. 6, 2

B. −4, −3

C. −6, −2

D. −6

41. Solve this equation: =

A. 4

B. 2

C. 3

D. no solution

42. Mark can clean his father’s office in 30 minutes. His younger sister Lynn can clean the office in

40 minutes. How long will it take the two of them together to clean the office?

A. about 10 minutes

B. about 5.5 minutes

C. about 35 minutes

D. about 17 minutes

43. The height of a square prism is 3n + 1. The volume of the prism is 3n 3 + 13n 2 + 16n + 4.

What is the area of the square base of the prism?

2

A. n – 4n – 4

2

B. n + 4n + 4

2

C. 3n + 4n + 1

2

D. 3n + 4

44. Which expression is equivalent to – ?

A.

B.

C.

D.

45. Which is equivalent to ?

3

5

A. 12 + 18xy – 6x y

3

5

B. 4xy – 2x y

3

5

C. 3 + 4xy – 2x y

2

3 4

7 2

D. 3x y + 4x y – 2x y

46. Which is equivalent to

A.

B.

C.

D.

47. What is the solution of the equation = ?

A. 0

B. 2

C. 0 and 2

D. no solution

48. What is the simplified form of ?

A.

B.

C.

D.

49. Karen can mow the lawn in 15 minutes. Her friend Kim can mow the lawn in 10 minutes. If

they work together, how many minutes will they take to mow the lawn?

A. 6 minutes

B. 5 minutes

C. 12.5 minutes

D. 2.5 minutes

50. What is the simplified form of ?

A. x – 3

B.

C.

D.

2. Simplify

.

A.

B.

C.

D.

3. Which of the following equals

?

A.

B.

C.

D.

4. Which of the following equals

?

A.

B.

C.

D.

5. A square window has an area of 96 ft 2. What is the length of each side of the window in

simplest radical form?

A.

B. 4

C.

D. 10

6. Simplify

.

A.

B.

C.

D.

7. Which radical expression is NOT equal to

?

A.

B.

C.

D.

8. Simplify

.

A.

B.

C.

D. 20

9. Which of the following are solution(s) of

A. 6, –1

B. – 6, 1

C. 6

D. –1

?

10. Which of the following are solution(s) of

?

A. –1

B. 6

C.

D. no solution

11. Which radical equation has no solution?

A.

B.

C.

D.

12. Which shows the most appropriate first step in solving

A.

B.

C.

D.

13. What is the solution of

A. – 8

B. 4

C. 2, 4

D. 4, –2

?

?

14. For which values of a does

have NO solution?

A. a < –9
B. a > –9

C. a = x and a = 3

D. The equation has a solution for all real values of a .

15. Solve

.

A. 9

B. 12

C. 18

D. 2

16. Which of the following is the graph of

?

A.

B.

C.

D.

17. What is the least possible value for x for the graph of

A. 3

B. 19

C. 22

D. 25

?

18. What is the greatest possible value of y for the graph of

A. –10

B. –2

C. 0

D. 2

19. If x = –2, which function has the least value?

A.

B.

C.

D.

20.

If

and

, then what does

equal?

A.

B.

C. 2

D. 4

21. In which quadrant(s) is the graph of

A. II and III

B. I and IV

C. I

D. II

?

?

22.

Find the value of x to the nearest tenth in this right triangle.

A. 7.2

B. 9.1

C. 10.9

D. 11.9

is a right triangle with a right angle at M . Which of the given statements is false?

23.

A.

B.

C.

D.

24. A carpenter makes a rooftop like the one at the right.How high above the ground is the peak

of the roof?

A. about 19 ft.

B. about 19.2 ft.

C. about 20.4 ft.

D. about 20.7 ft.

25. A right triangle GHK has a hypotenuse of 17 feet and ∠G = 78°. What is the perimeter to the

nearest foot?

A. 37 ft.

B. 38 ft.

C. 40 ft.

D. 42 ft.

26. Use the triangle shown. Find the missing side length; round to the nearest tenth if necessary.

a = 28, b = 35, c = ?

A. 28.3

B. 63

C. 21

D. 44.8

27. Use the triangle shown. Find the missing side length; round to the nearest tenth if necessary.

b = 4.0, c = 4.1, a = ?

A. 0.9

B. 5.7

C. 0.1

D. 8.1

28. Use the triangle shown. Find the missing side length; round to the nearest tenth if necessary.

a = 10, c = 26, b = ?

A. 27.9

B. 36

C. 24

D. 16

29. State whether segments of the given lengths can be the sides of a right triangle.

7, 24, 25

A. yes

B. no

C. not enough information

30. State whether segments of the given lengths can be the sides of a right triangle.

8, 16, 17

A. yes

B. no

C. not enough information

31. Simplify the radical expression:

A.

B.

C.

D. 6

32. Simplify the radical expression:

A.

B.

C.

D.

33. Simplify the radical expression:

A.

B.

C. 40

D. – 6

34.

Simplify the radical expression:

A.

B.

C.

D. – 3

35.

Simplify the radical expression:

A.

B.

C.

D.

36.

Simplify the radical expression:

A.

B.

C.

D.

37.

Simplify the radical expression:

A.

B.

C.

D.

38. Simplify the radical expression:

A.

B.

C.

D.

39. Solve the radical equation and check your solution.

A. 60.5

B. 4.5

C. 3

D. 9

40. Solve the radical equation and check your solution.

A. 6

B. 484

C. 15

D. 1296

41. Solve the radical equation and check your solution.

A.

B.

C.

D. 11

42. Solve the radical equation and check your solution.

A.

B. –4

C. 4

D.

43. Solve the radical equation and check your solution.

A. –2

B. 1

C. –1

D. 2

44. Solve the radical equation and check your solution.

A. 1

B. no solution

C. 6

D. –6

45. Graph this function:

A.

B.

C.

D.

46. Graph this function:

A.

B.

C.

D.

47. Graph this function:

A.

B.

C.

D.

48. Find the missing side length of this triangle:

A. 29

B. 41

C. 22

D. 27.6

49. Find the missing side length of this triangle:

A. 25

B. 9

C. 15

D. 18.9

50. A right triangle has a 50° angle. The hypotenuse is 10 cm long. To the nearest tenth, what is

the length of the side opposite the 50° angle?

A. 7.7 cm.

B. 6.4 cm.

C. 11.9 cm.

D. 13.1 cm.

1. Which of the following describes the graph of the function y =

+ 2?

A. a line with slope 3 and y -intercept 2

B. a line with slope

and y -intercept 2

C. a rational function with asymptotes at x = 0 and y = 2

D. a rational function with asymptotes at x = −3 and y = −2

2.

The graph of y =

is translated down 3 units. What is the equation of the new graph?

A. y =

B. y =

C. y =

+3

D. y =

–3

3. An area of a rectangle is 4b 3 + 5b – 3 in 2. The width of the rectangle is 2b – 1 in. What is

the length of the rectangle?

2

A. 2b – b – 3

2

B. 4b + b + 3

2

C. 2b + b + 3

2

D. 2b + 5b + 3

4. Which statement does not describe the graph of y =

?

A. The function is undefined when x = 3, so it has a vertical asymptote at x = 3.

B. The graph has an axis of symmetry.

C. The graph has a horizontal asymptote at y = 2.

D. The graph crosses the y -axis at

.

5. Which of the following expressions simplifies to −1?

A.

B.

C.

D.

6.

Simplify

.

A.

B.

C.

D.

7. Which of the following expressions is in simplest form?

A.

B.

C.

D.

8.

Which values of x are NOT in the domain of

A. −1 and 3

B. 1 and −3

C. 2 and 5

D. −2 and −5

?

9. Add:

+

A.

B.

C.

D.

10.

Simplify (2x – 5) •

.

A. 1

B.

C.

D.

11.

Simplify

A. −3

B.

C.

D.

÷

.

12.

2

÷ (2r – 2)?

Which expression is equivalent to

2

(r – 1)

A.

B.

C.

D.

13.

Which cannot be the first step in multiplying

•

A. Multiply the numerators.

B. Find the reciprocal of

.

C. Factor each polynomial.

D. Multiply the denominators.

14. Which of the following expressions equals (3x 3 – 4x – 1) ÷ (x + 1)?

2

A. 3x – 3x – 7 +

2

B. 3x – 3x – 7 –

2

C. 3x – 3x – 1

2

D. 3x – 7x + 8

15. What is the remainder when x 2 – 4 is divided by x – 3?

A. −13

B. 5

C.

D.

?

16. Which of the following must be true for (x 2 + 2x + 1) ÷ (x + 3)?

A. The remainder is negative.

B. The dividend is in standard form.

C. The remainder is negative and the dividend is in standard form.

D. The dividend is in standard form and the quotient is larger than the divisor for positive

values of x .

17. Subtract

.

A. −2

B.

C.

D.

18. What is the least common denominator of

A. x + 1

B. x – 1

2

C. x – 1

2

D. (x – 1)(x – 1)

19. Add:

+

A.

B.

C.

D.

?

20. Which is the solution of

+

=

?

A. −4

B. −2

C. 2

D. 4

21. Solve

=

.

A. 3, 4

B. 1, 3

C. −1, 2

D. no solution

22. What is the least common denominator of

,

, and

?

A. 2x

B. 3x

C. 6x

D. 6x

2

23. Which equation of inverse variation includes the point (2, 2)?

A. xy = 0

B. xy = 4

C. xy = 2

D. xy = −4

24. Which equation of inverse variation includes the point (−8, −4)?

A. xy = −12

B. xy = 2

C. xy = −32

D. xy = 32

25. What is the excluded value for this rational function: f (x ) =

?

A. 5

B. −19

C. −5

D. 0

26. What is the excluded value for this rational function: y =

A. −1.5

B. 0

C. 1.5

D. 2

?

27. Graph this function: y =

A.

B.

C.

D.

28. Graph this function: y =

A.

B.

C.

D.

+3

29. Graph this function: f (x ) =

A.

B.

C.

D.

30.

Simplify, state any excluded values:

A. 2, p ≠ 0

B. 2, p ≠ 5

C. 3, p ≠ 3

D. 6, p ≠ 5

31.

Simplify, state any excluded values:

A. (n – 1), n ≠ 4

B. (n + 5), n ≠ 5

C. (n – 1), n ≠ −5

D.

32.

Multiply:

, n ≠ −5

•

A.

B.

C.

D.

33.

Divide:

A.

B.

C.

D.

÷

34. Divide: (12x 4 + 9x 3 – 10x 2) ÷ 3x 3

A. 9x + 6 –

B. 4x + 3 –

C. 4x + 3 +

2

D. 4x + 3x – 10

35. Divide: (4x 4 – 6x 3 – 2x 2 – 2x ) ÷ (2x – 1)

3

2

3

2

3

2

3

2

A. 2x – 4x – 1

B. 2x – 3x – x – 1

C. 2x – 2x – 2x – 2 –

D. 2x – 2x – 2x – 2 +

36. Find the LCD of this pair of expressions:

,

A. 3h

B. h

C. 3

D. 3h

37.

2

Find the LCD of this pair of expressions:

3 7

A. 9a b

B. 9ab

C. 9ab

3

2 4

D. 9a b

,

38. Add:

+

A.

B.

C.

D.

39.

Subtract:

–

A.

B.

C.

D.

40. Solve this equation:

+

=

A. 6, 2

B. −4, −3

C. −6, −2

D. −6

41. Solve this equation:

A. 4

B. 2

C. 3

D. no solution

=

42. Mark can clean his father’s office in 30 minutes. His younger sister Lynn can clean the office in

40 minutes. How long will it take the two of them together to clean the office?

A. about 10 minutes

B. about 5.5 minutes

C. about 35 minutes

D. about 17 minutes

43. The height of a square prism is 3n + 1. The volume of the prism is 3n 3 + 13n 2 + 16n + 4.

What is the area of the square base of the prism?

2

A. n – 4n – 4

2

B. n + 4n + 4

2

C. 3n + 4n + 1

2

D. 3n + 4

44. Which expression is equivalent to

–

?

A.

B.

C.

D.

45.

Which is equivalent to

?

3

5

A. 12 + 18xy – 6x y

3

5

B. 4xy – 2x y

3

5

C. 3 + 4xy – 2x y

2

3 4

7 2

D. 3x y + 4x y – 2x y

46.

Which is equivalent to

A.

B.

C.

D.

47.

What is the solution of the equation

=

?

A. 0

B. 2

C. 0 and 2

D. no solution

48.

What is the simplified form of

?

A.

B.

C.

D.

49. Karen can mow the lawn in 15 minutes. Her friend Kim can mow the lawn in 10 minutes. If

they work together, how many minutes will they take to mow the lawn?

A. 6 minutes

B. 5 minutes

C. 12.5 minutes

D. 2.5 minutes

50.

What is the simplified form of

A. x – 3

B.

C.

D.

?

1. Which of the following describes the graph of the function y =

+ 2?

A. a line with slope 3 and y -intercept 2

B. a line with slope

and y -intercept 2

C. a rational function with asymptotes at x = 0 and y = 2

D. a rational function with asymptotes at x = −3 and y = −2

2.

The graph of y =

is translated down 3 units. What is the equation of the new graph?

A. y =

B. y =

C. y =

+3

D. y =

–3

3. An area of a rectangle is 4b 3 + 5b – 3 in 2. The width of the rectangle is 2b – 1 in. What is

the length of the rectangle?

2

A. 2b – b – 3

2

B. 4b + b + 3

2

C. 2b + b + 3

2

D. 2b + 5b + 3

4. Which statement does not describe the graph of y =

?

A. The function is undefined when x = 3, so it has a vertical asymptote at x = 3.

B. The graph has an axis of symmetry.

C. The graph has a horizontal asymptote at y = 2.

D. The graph crosses the y -axis at

.

5. Which of the following expressions simplifies to −1?

A.

B.

C.

D.

6.

Simplify

.

A.

B.

C.

D.

7. Which of the following expressions is in simplest form?

A.

B.

C.

D.

8.

Which values of x are NOT in the domain of

A. −1 and 3

B. 1 and −3

C. 2 and 5

D. −2 and −5

?

9. Add:

+

A.

B.

C.

D.

10.

Simplify (2x – 5) •

.

A. 1

B.

C.

D.

11.

Simplify

A. −3

B.

C.

D.

÷

.

12.

2

÷ (2r – 2)?

Which expression is equivalent to

2

(r – 1)

A.

B.

C.

D.

13.

Which cannot be the first step in multiplying

•

A. Multiply the numerators.

B. Find the reciprocal of

.

C. Factor each polynomial.

D. Multiply the denominators.

14. Which of the following expressions equals (3x 3 – 4x – 1) ÷ (x + 1)?

2

A. 3x – 3x – 7 +

2

B. 3x – 3x – 7 –

2

C. 3x – 3x – 1

2

D. 3x – 7x + 8

15. What is the remainder when x 2 – 4 is divided by x – 3?

A. −13

B. 5

C.

D.

?

16. Which of the following must be true for (x 2 + 2x + 1) ÷ (x + 3)?

A. The remainder is negative.

B. The dividend is in standard form.

C. The remainder is negative and the dividend is in standard form.

D. The dividend is in standard form and the quotient is larger than the divisor for positive

values of x .

17. Subtract

.

A. −2

B.

C.

D.

18. What is the least common denominator of

A. x + 1

B. x – 1

2

C. x – 1

2

D. (x – 1)(x – 1)

19. Add:

+

A.

B.

C.

D.

?

20. Which is the solution of

+

=

?

A. −4

B. −2

C. 2

D. 4

21. Solve

=

.

A. 3, 4

B. 1, 3

C. −1, 2

D. no solution

22. What is the least common denominator of

,

, and

?

A. 2x

B. 3x

C. 6x

D. 6x

2

23. Which equation of inverse variation includes the point (2, 2)?

A. xy = 0

B. xy = 4

C. xy = 2

D. xy = −4

24. Which equation of inverse variation includes the point (−8, −4)?

A. xy = −12

B. xy = 2

C. xy = −32

D. xy = 32

25. What is the excluded value for this rational function: f (x ) =

?

A. 5

B. −19

C. −5

D. 0

26. What is the excluded value for this rational function: y =

A. −1.5

B. 0

C. 1.5

D. 2

?

27. Graph this function: y =

A.

B.

C.

D.

28. Graph this function: y =

A.

B.

C.

D.

+3

29. Graph this function: f (x ) =

A.

B.

C.

D.

30.

Simplify, state any excluded values:

A. 2, p ≠ 0

B. 2, p ≠ 5

C. 3, p ≠ 3

D. 6, p ≠ 5

31.

Simplify, state any excluded values:

A. (n – 1), n ≠ 4

B. (n + 5), n ≠ 5

C. (n – 1), n ≠ −5

D.

32.

Multiply:

, n ≠ −5

•

A.

B.

C.

D.

33.

Divide:

A.

B.

C.

D.

÷

34. Divide: (12x 4 + 9x 3 – 10x 2) ÷ 3x 3

A. 9x + 6 –

B. 4x + 3 –

C. 4x + 3 +

2

D. 4x + 3x – 10

35. Divide: (4x 4 – 6x 3 – 2x 2 – 2x ) ÷ (2x – 1)

3

2

3

2

3

2

3

2

A. 2x – 4x – 1

B. 2x – 3x – x – 1

C. 2x – 2x – 2x – 2 –

D. 2x – 2x – 2x – 2 +

36. Find the LCD of this pair of expressions:

,

A. 3h

B. h

C. 3

D. 3h

37.

2

Find the LCD of this pair of expressions:

3 7

A. 9a b

B. 9ab

C. 9ab

3

2 4

D. 9a b

,

38. Add:

+

A.

B.

C.

D.

39.

Subtract:

–

A.

B.

C.

D.

40. Solve this equation:

+

=

A. 6, 2

B. −4, −3

C. −6, −2

D. −6

41. Solve this equation:

A. 4

B. 2

C. 3

D. no solution

=

42. Mark can clean his father’s office in 30 minutes. His younger sister Lynn can clean the office in

40 minutes. How long will it take the two of them together to clean the office?

A. about 10 minutes

B. about 5.5 minutes

C. about 35 minutes

D. about 17 minutes

43. The height of a square prism is 3n + 1. The volume of the prism is 3n 3 + 13n 2 + 16n + 4.

What is the area of the square base of the prism?

2

A. n – 4n – 4

2

B. n + 4n + 4

2

C. 3n + 4n + 1

2

D. 3n + 4

44. Which expression is equivalent to

–

?

A.

B.

C.

D.

45.

Which is equivalent to

?

3

5

A. 12 + 18xy – 6x y

3

5

B. 4xy – 2x y

3

5

C. 3 + 4xy – 2x y

2

3 4

7 2

D. 3x y + 4x y – 2x y

46.

Which is equivalent to

A.

B.

C.

D.

47.

What is the solution of the equation

=

?

A. 0

B. 2

C. 0 and 2

D. no solution

48.

What is the simplified form of

?

A.

B.

C.

D.

49. Karen can mow the lawn in 15 minutes. Her friend Kim can mow the lawn in 10 minutes. If

they work together, how many minutes will they take to mow the lawn?

A. 6 minutes

B. 5 minutes

C. 12.5 minutes

D. 2.5 minutes

50.

What is the simplified form of

A. x – 3

B.

C.

D.

?

The price is based on these factors:

Academic level

Number of pages

Urgency

Basic features

- Free title page and bibliography
- Unlimited revisions
- Plagiarism-free guarantee
- Money-back guarantee
- 24/7 support

On-demand options

- Writer’s samples
- Part-by-part delivery
- Overnight delivery
- Copies of used sources
- Expert Proofreading

Paper format

- 275 words per page
- 12 pt Arial/Times New Roman
- Double line spacing
- Any citation style (APA, MLA, Chicago/Turabian, Harvard)

Delivering a high-quality product at a reasonable price is not enough anymore.

That’s why we have developed 5 beneficial guarantees that will make your experience with our service enjoyable, easy, and safe.

You have to be 100% sure of the quality of your product to give a money-back guarantee. This describes us perfectly. Make sure that this guarantee is totally transparent.

Read moreEach paper is composed from scratch, according to your instructions. It is then checked by our plagiarism-detection software. There is no gap where plagiarism could squeeze in.

Read moreThanks to our free revisions, there is no way for you to be unsatisfied. We will work on your paper until you are completely happy with the result.

Read moreYour email is safe, as we store it according to international data protection rules. Your bank details are secure, as we use only reliable payment systems.

Read moreBy sending us your money, you buy the service we provide. Check out our terms and conditions if you prefer business talks to be laid out in official language.

Read more