A doctor estimates that a particular patient is losing bone density at a rate of 3% annually. The patient currently has a bone density of 1,500 kg/mg3. The doctor writes an exponential function to represent the situation. Which values should the doctor use for a and b in a function written in the form f(x) = abx, where f(x) represents the bone density after x years? a = b =

Since you're starting off with a bone density of 1,500 kg/mg3, that should be your a value. Anything in the form of ab[tex] b^{x} [/tex] will be arranged as follows: Your a value is your starting value, whereas the b value is the rate at which your starting value will change every x years. In this case, that would mean that f(x)=1,500*[tex]0.97^x[/tex]. A=1,500 and B=0.97

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eudora eudora · Answer 2 · 2019-08-18T09:40:36+02:00

Answer:

a = 1500 and b = 0.97

Step-by-step explanation:

A patient is losing bone density at a rate of 3% annually.

Present bone density of the bones is 1500 kg/mg³

Doctor writes an exponential function to represent the situation.

The exponential function will be f(x) = [tex]a(b)^{x}[/tex] which is an explicit formula for exponential sequence.

Here a = initial bone density of the patient

b = common ratio of the sequence formed in x years

x = time in years

Then the values of a and b in the formula will be

a = 1500

b = (1 - 0.03) = 0.97

and the function will be [tex]f(x)=1500(0.97)^{x}[/tex]

Therefore, a = 1500 and b = 0.97 will be the answer.