1 |-9| = -9 2 |9| = 9 3 |9| = -9 4 |-9| = 9

1 |-9| = -9 2 |9| = 9 3 |9| = -9 4 |-9| = 9

the connection between the frontier values and the American ideal of "equal opportunity

Plz help I can't figure this out

Please make the answer understandable, and not really really confusing. Thank You!

f(x)=2x-7 x | f(x) --|---- 5 ?

f(x) = 3x2 - 4 g(x) = -3x2 + 69 What is the value of f(g(5)) ?

The value of each truck that a delivery company owns is a linear function of the age of the truck. If a truck that is one year old is worth $13,750 and a truck that is 7 years old is worth $6,250,...

x-7/3x^2-8x+4 divided by 3x-21/6x^2-24 i need help on this math problem for my alg/trig homework

4x+1 ---------- x^2-6x+5

Solve for ALL values of x in the real number system. If an EXACT solution does not exist, round your answers to the nearest hundredth. sin2x = sinx

a) {-0.67,1.00} b) {-6,2} c) {-0.33,-0.67} d) {-1.50,0.50}

23x-6y=7x+6y

a) {2.09, -0.84} b) {-4,5} c) {-1.25,-1.75} d) {-0.57,0.71}

a) {-1.29,0.57} b) {-9,4} c) {-0.44,-0.78} d) {-0.69,1.13}

1. f (x) = 3x + 2 3. G (x) = x² + 1 7. H (x) = x² - x + 1 9. f (x) = (2x - 5) / 3 13. F (x) = (x - 2) / 2 My math book, in the answer sheet says that "none"...

For this problem, assume that 3, 6, 5, and 2 are equally likely, a 4 is four times as likely as a 2, and a 1 is twice as likely as a 4.

Select the approximate values of x that are solutions to f(x) = 0, where f(x) = -6x2 + 3x + 3. A. {1.00, –0.50} B. {-6, 3} C.{–0.50, –0.50} D. {–2.00,...

Consider the function f(x)=3x3-5x on the interval [-5,5]. Find the average or mean slope of the function on this interval. By the mean value theorem, we know there exists at least on c in the...

Find all the values of x such that the given series would converge Σn=1 (infinity on top) (x-10)n/10n Please give the answer in interval notation

For this problem, assume that all the odd numbers are equally likely to come up, all the even numbers are equally likely to come up, and the odd numbers are 3 times as likely to come up as the even...