Diagnostic Examination

If you divide 12ab³ by 4b, the answer is

(a)

ab³ - b

(b)

3ab²

(c)

8b²

(d)

(e)

ab²

Find the product (2x+y)(y-3x).

(a)

-6x² + y² - xy

(b)

-6x² + y²

(c)

-xy

(d)

6x² + y² - xy

(e)

All of the other answers are incorrect.

Evaluate

(

+ 3 ) ( 5 +

x²

(a)

x²

(b)

+ 15 +

x²

(c)

All of the other answers are incorrect.

(d)

+ 15 +

x³

x²

(e)

x²

The set of points (x,y) such that x² + y² = 9 is

(a)

a circle of radius 9 centered at (0,0)

(b)

a parabola

(c)

a circle of radius 3 centered at (1,1)

(d)

an hyperbola

(e)

a circle of radius 3 centered at (0,0)

Find the equation of the line perpendicular to y = x/3 + 1 through the point (3,2).

(a)

y = 3x - 7

(b)

y = x/3 +1

(c)

y = -x/3 + 3

(d)

y = x/3 + 7

(e)

y = - 3x + 11

The line containing the points (1,1) and (1,-1) is perpendicular to the line

(a)

y = 5

(b)

y = 2x +1

(c)

y -1 = x -1

(d)

y = -x -1

(e)

x = 5

If 3x + 6 = 12, what is x?

(a)

x = 4

(b)

x = 0

(c)

x = 2

(d)

x = -2

(e)

All of the other answers are incorrect.

If x = 3, find the smallest value of y which satisfies y²x + 3yx² + 54 = 0.

(a)

(b)

(c)

There is no smallest value.

(d)

-3

(e)

-6

Find the largest solution of x³ + 4x² + 3x = 0.

(a)

x = -2

(b)

x = -3

(c)

x = -1

(d)

x = 0

(e)

x = 1

10.

If f(x) = 2^-x, find f(4).

(a)

-1/16

(b)

-16

(c)

1/16

(d)

(e)

11.

log(x) < log(x +1) reduces to

(a)

x < 1

(b)

x < x +1

(c)

x < 0

(d)

1 < x

(e)

0 < x

12.

Which of the following values of x satisfies log₂(3x) + log₂(2x) = 3?

(a)

x = (3/2)^1/2

(b)

x = 5

(c)

x = 3/5

(d)

x = 4

(e)

x = (4/3)^1/2

13.

If g(x) = 5x + 2, what is g(2)?

(a)

(b)

(c)

(d)

(e)

14.

If h(x) = x³, g(x) = x²+1 and f(x) = x +1, then h(g(f(0))) + f(g(h(0))) is:

(a)

(b)

(c)

(d)

(e)

15.

If f(x) = 3x² + 4 and g(y) = 2y^1/2 + 5, what is g(f(2))?

(a)

(b)

(c)

(d)

(e)

All of the other answers are incorrect.

16.

The inequality x² - 2x > -1 reduces to

(a)

x > 1

(b)

x < -1

(c)

x is not equal to 1

(d)

x > -1

(e)

x < 1

17.

The expression | 5x-2 | > 1 is equivalent to which of the following?

(a)

x < 1/5 and x > 3/5

(b)

There are no values of x which satisfy this expression.

(c)

x < -1/5 or x > 3/5

(d)

x < 1/5 or x > 3/5

(e)

x < -1/5

18.

Under which of the following conditions does x satisfy

x + 2

| x - 1 |

> 0

(a)

x - 1 > 0 and x + 2 > 0

(b)

x + 2 > 0

(c)

x is not equal to 1 and x + 2 > 0

(d)

There are no values of x which satisfy this expression.

(e)

All of the other answers are incorrect.

19.

If 4x - y = 1 and 2x + y = 5, find x and y.

(a)

x = 0 and y = 6

(b)

x = 4 and y = 1

(c)

x = 0 and y = 3

(d)

x = -1 and y = 5

(e)

x = 1 and y = 3

20.

If x - y = 4 and 4x - y = 1, then 3xy is

(a)

(b)

(c)

(d)

Cannot be determined

(e)

21.

If y + 3x + 2 = 0 and y = x², then there is a solution with x given by

(a)

x = 0

(b)

Cannot be determined

(c)

x = 1

(d)

x = 2

(e)

x = -1

22.

The radian measure of an angle of 60 degrees is

(a)

2(pi/3)

(b)

pi/4

(c)

pi/2

(d)

(e)

pi/3

23.

If sin(a) = 1, cos(b) > 0, and sin(b) = 1/2, then sin(a + b) is

(a)

3^1/2/2

(b)

1/2

(c)

3/2

(d)

2/3

(e)

2/(3^1/2)

24.

If sin(a + b) = 1 and cos(a) = 0, then cos(2b) is

(a)

cannot be determined

(b)

1/2

(c)

(d)

(e)