Sat math Essentials
Yüklə 10,64 Kb. Pdf görüntüsü
|
|
4.
e. To find the total number of different guitars that are offered, multiply the number of neck choices by the number of body choices by the number of color choices: (4)(2)(6) = 48 differ- ent guitars. 5. c. The set of positive factors of 12 is {1, 2, 3, 4, 6, 12}. All of the even numbers (2, 4, 6, and 12) are multiples of 2. The only positive factors of 12 that are not multiples of 2 are 1 and 3. 6. b. Be careful—the question asks you for the num- ber of values of f (3), not f ( x ) = 3. In other words, how many y values can be generated when x = 3? If the line x = 3 is drawn on the graph, it passes through only one point. There is only one value for f (3). 7. d. Factor the numerator and denominator of the fraction: ( x 2 + 5 x ) = x ( x + 5) ( x 3 – 25 x ) = x ( x + 5)( x – 5) There is an x term and an ( x + 5) term in both the numerator and denominator. Cancel those terms, leaving the fraction x – 1 5 . 8. c. The equation of a parabola with its turning point c units to the left of the y -axis is written as y = ( x + c ) 2 . The equation of a parabola with its turning point d units above the x -axis is written as y = x 2 + d . The vertex of the parabola formed by the equation y = ( x + 1) 2 + 2 is found one unit to the left of the y -axis and two units above the x -axis, at the point (–1,2). Alternatively, test each answer choice by plugging the x value of the choice into the equation and solving for y . Only the coordinates in choice c , (–1, 2), repre- sent a point on the parabola ( y = ( x + 1) 2 + 2, 2 = (–1 + 1) 2 + 2, 2 = 0 2 + 2, 2 = 2), so it is the only point of the choices given that could be the ver- tex of the parabola. Yüklə 10,64 Kb. Dostları ilə paylaş:
|