Find the compound interest for Rs.\6000\ at \9%\ per annum for \18\ months if interest is compounded semi-annually?
Answer
Verified573.3k+ views
Hint:To find the compound interest for the question, we first find the amount generated for the time period of three years by using the formula of:
\[A=P{{\left[ 1+\dfrac{R}{100} \right]}^{nt}}\]
where \[A\] is the amount generated by the compound interest, \[P\] is the principal, \[R\] is the rate of interest, \[n\] is the value of compounding, \[t\] is the value of the time period. After this we find the compound interest by subtracting the amount and principal.
Complete step by step solution:
According to the question given, the principal amount of the investment is given as Rs.\[6000\].
The rate of interest for the investment is given as \[9%\] per annum.
The time period for the investment is given as \[18\] months.
Now to find the time period for the investment when invested semi-annually is given as the product of \[nt\] where the value of \[n\] is given as \[2\] and the time period is given as \[3\text{ }years\].
Hence, The total time period for compounding semi-annually is \[2\times 3=6\].
Now placing the values in the formula for the compound interest is given as:
\[\Rightarrow A=6000{{\left[ 1+\dfrac{9}{100} \right]}^{6}}\]
\[\Rightarrow A=6000{{\left[ \dfrac{109}{100} \right]}^{6}}\]
\[\Rightarrow A=6000{{\left[ 1.09 \right]}^{6}}\]
Applying the power form the value as:
\[\Rightarrow A=Rs.10062\]
Applying the formula of the compound interest as the subtraction between the amount and the principal as:
Compound Interest \[=\] Amount \[-\] Principal
Compound Interest \[=Rs.10062-Rs.6000\]
Compound Interest \[=Rs.4062\]
Therefore, the value of the compound interest as \[Rs.4062\].
Note: Semi-annually means twice a year, annually means yearly, quarterly means four times in a year. Compound interest is different from simple interest as in compound interest the interest every year is applied on the interest before and time period changes according to the period of compounding of the investment.
\[A=P{{\left[ 1+\dfrac{R}{100} \right]}^{nt}}\]
where \[A\] is the amount generated by the compound interest, \[P\] is the principal, \[R\] is the rate of interest, \[n\] is the value of compounding, \[t\] is the value of the time period. After this we find the compound interest by subtracting the amount and principal.
Complete step by step solution:
According to the question given, the principal amount of the investment is given as Rs.\[6000\].
The rate of interest for the investment is given as \[9%\] per annum.
The time period for the investment is given as \[18\] months.
Now to find the time period for the investment when invested semi-annually is given as the product of \[nt\] where the value of \[n\] is given as \[2\] and the time period is given as \[3\text{ }years\].
Hence, The total time period for compounding semi-annually is \[2\times 3=6\].
Now placing the values in the formula for the compound interest is given as:
\[\Rightarrow A=6000{{\left[ 1+\dfrac{9}{100} \right]}^{6}}\]
\[\Rightarrow A=6000{{\left[ \dfrac{109}{100} \right]}^{6}}\]
\[\Rightarrow A=6000{{\left[ 1.09 \right]}^{6}}\]
Applying the power form the value as:
\[\Rightarrow A=Rs.10062\]
Applying the formula of the compound interest as the subtraction between the amount and the principal as:
Compound Interest \[=\] Amount \[-\] Principal
Compound Interest \[=Rs.10062-Rs.6000\]
Compound Interest \[=Rs.4062\]
Therefore, the value of the compound interest as \[Rs.4062\].
Note: Semi-annually means twice a year, annually means yearly, quarterly means four times in a year. Compound interest is different from simple interest as in compound interest the interest every year is applied on the interest before and time period changes according to the period of compounding of the investment.
Recently Updated Pages
Three beakers labelled as A B and C each containing 25 mL of water were taken A small amount of NaOH anhydrous CuSO4 and NaCl were added to the beakers A B and C respectively It was observed that there was an increase in the temperature of the solutions contained in beakers A and B whereas in case of beaker C the temperature of the solution falls Which one of the following statements isarecorrect i In beakers A and B exothermic process has occurred ii In beakers A and B endothermic process has occurred iii In beaker C exothermic process has occurred iv In beaker C endothermic process has occurred
Master Class 11 Social Science: Engaging Questions & Answers for Success
Master Class 11 Physics: Engaging Questions & Answers for Success
Master Class 11 Maths: Engaging Questions & Answers for Success
Master Class 11 Economics: Engaging Questions & Answers for Success
Master Class 11 Computer Science: Engaging Questions & Answers for Success
Three beakers labelled as A B and C each containing 25 mL of water were taken A small amount of NaOH anhydrous CuSO4 and NaCl were added to the beakers A B and C respectively It was observed that there was an increase in the temperature of the solutions contained in beakers A and B whereas in case of beaker C the temperature of the solution falls Which one of the following statements isarecorrect i In beakers A and B exothermic process has occurred ii In beakers A and B endothermic process has occurred iii In beaker C exothermic process has occurred iv In beaker C endothermic process has occurred
Master Class 11 Social Science: Engaging Questions & Answers for Success
Master Class 11 Physics: Engaging Questions & Answers for Success
Trending doubts
One Metric ton is equal to kg A 10000 B 1000 C 100 class 11 physics CBSE
There are 720 permutations of the digits 1 2 3 4 5 class 11 maths CBSE
State and prove Bernoullis theorem class 11 physics CBSE
Draw a diagram of a plant cell and label at least eight class 11 biology CBSE
Difference Between Prokaryotic Cells and Eukaryotic Cells
1 Quintal is equal to a 110 kg b 10 kg c 100kg d 1000 class 11 physics CBSE