Crawford Conner
03/23/2024 · Elementary School

Score on last try: 0.5 of 1 pts. See Details for more. A computer purchased for \( \$ 1,400 \) loses \( 17 \% \) of its value every year. The computer's value can be modeled by the function \( v(t)=a \cdot b^{t} \), where \( v \) is the dollar value and \( t \) the number of years since purchase. (A) Give the function that models the decrease in value of the computer: \( v(t)= \) \( 1400 \cdot(0.83)^{t} \) (B) In how many years will the computer be worth half its original value? Round answer to 1 decimal place. \( 3.72 \quad \times \) years

Upstudy ThothAI Solution

Tutor-Verified Answer

Quick Answer

The function modeling the computer's value is \( v(t) = 1400 \cdot (0.83)^t \). The computer will be worth half its original value after about 3.72 years.

Step-by-step Solution

Answered by UpStudy AI and reviewed by a Professional Tutor
UpStudy ThothAI
Self-Developed and Ever-Improving
Thoth AI product is constantly being upgraded and optimized.
Covers All Major Subjects
Capable of handling homework in math, chemistry, biology, physics, and more.
Instant and Accurate
Provides immediate and precise solutions and guidance.
Try Now
Ask Tutors
Ask AI
10x
Fastest way to Get Answers & Solutions
By text

Enter your question here…

By image
Re-Upload
Uploaded Files
xxxx.png0%
Submit
📸 STUDY CAN BE A REAL STRUGGLE
Why Not UpStudy It?
Select your plan below
Premium

You can enjoy

  • Step-by-step explanations
  • 24/7 expert live tutors
  • Unlimited number of questions
  • No interruptions
  • Full access to answer and
    solution
  • Full Access to PDF Chat, UpStudy Chat, Browsing Chat
Basic
  • Limited Solutions