Ask Question
6 March, 17:54

A new building that costs $1,000,000 has a useful life of 10 years and a scrap value of $200,000. Using straight-line depreciation, find the equation for the value V in terms of t, where t is in years. (Make sure you use t and not x in your answer.)

+4
Answers (1)
  1. 6 March, 19:47
    0
    V = - 80,000*t + 1,000,000

    Step-by-step explanation:

    Given:

    - The original cost V_i = $1,000,000

    - Scrap Value V_f = $200,000

    - Total number of years n = 10

    Find:

    Using straight-line depreciation, find the equation for the value V in terms of t, where t is in years.

    Solution:

    - The straight line depreciation method means their is a linear relationship between the value of building and time elapsed till useful life. The linear relationship takes a form:

    V = m*t + C

    Where,

    V: It is the current value of the building

    m: The rate at which value increase or decrease with time t

    C: The initial value of the building

    - We will compute constants m and C as follows:

    m = (V_f - V_i) / (10 - 0)

    m = (200,000 - 1,000,000) / 10

    m = - $80,000/year

    C = V_i = $1,000,000

    - Plug the values of the constants evaluated above in the linear expression:

    V = - 80,000*t + 1,000,000
Know the Answer?
Not Sure About the Answer?
Get an answer to your question ✅ “A new building that costs $1,000,000 has a useful life of 10 years and a scrap value of $200,000. Using straight-line depreciation, find ...” in 📙 Mathematics if there is no answer or all answers are wrong, use a search bar and try to find the answer among similar questions.
Search for Other Answers