1. What formula will be used to determine the amount invested? ? a. Is = Prt . = b. P = Is c c. Ic = F(1+1) i" d. P= (1+r)t
Answers
Answer:
Let the principal amount be equal to P. Let the rate at which the interest is levied is equal to R% per annum (per year). let the time for which the amount is lent = T years. Then we can write:
Simple Interest = [{P×R×T}/100]
We can also calculate the Principal amount as P = [{100×(Simple Interest)}/(R×T)].
Similarly, we can write the time T as equal to T = [{100×(Simple Interest)}/P×R].
Now let us solve some examples to get acquainted with these formulae.
Step-by-step explanation:
Example 1: Find the simple interest on Rs. 68,000 at 16(2/3)% per annum for a period of 9 months?
A) Rs. 8500 B) Rs. 3200 C) Rs. 2100 D) Rs. 4300
Answer: Here, P = Rs. 68000, R = 50/3% per annum and T = 9/12 years = 3/4 years. Note that the time has been converted into years as the rate is per annum. The units of rate R and the time T have to be consistent. Now using the formula for the simple interest, we have:
S.I. = [{P×R×T}/100]; therefore we may write: S.I. = Rs. [68000×(50/3)×(3/4)×(1/100)] = Rs. 8500.
In some cases the days of the start and the days when we calculate the interest are present. We don’t count the day on which we deposit the money. However, we do count the day on which we withdraw the money.
Answer:
Let the principal amount be equal to P. Let the rate at which the interest is levied is equal to R% per annum (per year). let the time for which the amount is lent = T years. Then we can write:
Simple Interest = [{P×R×T}/100]
We can also calculate the Principal amount as P = [{100×(Simple Interest)}/(R×T)].
Similarly, we can write the time T as equal to T = [{100×(Simple Interest)}/P×R].
Now let us solve some examples to get acquainted with these formulae.
Step-by-step explanation:
Example 1: Find the simple interest on Rs. 68,000 at 16(2/3)% per annum for a period of 9 months?
A) Rs. 8500 B) Rs. 3200 C) Rs. 2100 D) Rs. 4300
Answer: Here, P = Rs. 68000, R = 50/3% per annum and T = 9/12 years = 3/4 years. Note that the time has been converted into years as the rate is per annum. The units of rate R and the time T have to be consistent. Now using the formula for the simple interest, we have:
S.I. = [{P×R×T}/100]; therefore we may write: S.I. = Rs. 68000×(50/3)×(3/4)×(1/100)] = Rs. 8500.
In some cases the days of the start and the days when we calculate the interest are present. We don’t count the day on which we deposit the money. However, we do count the day on which we withdraw the money.
To know more about the formula of amount invested refer :
https://brainly.com/question/13139823
https://brainly.com/question/14306554.
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