Question: What is the significance of the 0 in the formula for simple interest?

  • Thread starter Thread starter catch.yossarian
  • Start date Start date
  • Tags Tags
    Interest
AI Thread Summary
The discussion clarifies that in the formula for simple interest, a(t) = a(0)(1 + rt), the "a(0)" represents the principal amount at time t=0, not a multiplication by zero. It emphasizes that a(0) is the value of the function a(t) evaluated at the initial time, which is crucial for understanding the calculation of interest over time. The confusion around division by zero is addressed, noting that it is not relevant in this context. Additionally, there are mentions of related topics such as depreciation and compounded payments, indicating a broader interest in financial calculations. Understanding the role of a(0) is essential for accurately applying the simple interest formula.
catch.yossarian
Messages
19
Reaction score
0
In Mathworld, they define Simple Interest as:

a(t) = a(0)(1 + rt)

where a(t) is the sum of principal and interest at time t for a constant interest rate r.

I just want to know why that 0 is in there. Anything divided by 0 will be 0, thus a(t) = 0?
 
Mathematics news on Phys.org
I would imagine that a(0) is the principle as it is the sum of the principle and the interest at t=0. Since there is no interest at t=0 the sum of the principle and the interest would be the principle.
 
Anything divided by 0 is undefined...

They're saying a(t) is a function and a(0) is that function evaluated at t=0.

It would be more clearly written a[t] = (1 + rt)*a[t=0]

cookiemonster
 
In other words, the "a(0)" is not "a times 0", it is "the function a(t) evaluated at t= 0".
 
HallsofIvy said:
In other words, the "a(0)" is not "a times 0", it is "the function a(t) evaluated at t= 0".
And in still more words (well, actually less words), "a(0)" is the principal.

Ironic - I was just looking for this formula so I could buy a car...

edit: oops - they don't use that formula.
 
Last edited:
Russ,

If you're talking about the depreciation curve, I think that's exponential, not linear.

Edit : No, you're calculating payments, aren't you. I think that's compounded.
 

Thread 'Trigonometry problem of interest'

Seemingly by some mathematical coincidence, a hexagon of sides 2,2,7,7, 11, and 11 can be inscribed in a circle of radius 7. The other day I saw a math problem on line, which they said came from a Polish Olympiad, where you compute the length x of the 3rd side which is the same as the radius, so that the sides of length 2,x, and 11 are inscribed on the arc of a semi-circle. The law of cosines applied twice gives the answer for x of exactly 7, but the arithmetic is so complex that the...
View full post »

Similar threads

MHB Calculate Simple Interest: 22K/yr, n=44, r=0.5
Replies
2
Views
1K
MHB Effective Rate of Interest
Replies
2
Views
2K
MHB Calculating Loan Payments: A Simple Formula
Replies
1
Views
2K
MHB Present value of a perpetual annuity
Replies
1
Views
2K
I Math Myth: You cannot divide by 0
Replies
5
Views
2K
MHB Calculate Compound Interest: Easy Step-by-Step Guide | Calculator Tips
Replies
2
Views
11K
I Why is estimation of ##\frac{Pv}{RT}=1+BP+CP^2+...## interesting?
Replies
2
Views
2K
I Verifying Equality: \mathcal{Im}[A+B+Te^{2ip}]=0
Replies
14
Views
2K
Simple Interest: Number of Years
Replies
2
Views
2K
MHB Continuous Compounding over 12 months (finding the rate)
Replies
2
Views
2K

Hot Threads

Recent Insights

Back
Top