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It decreases.
The period when an organism growth and activity decreases is called dormancy. This is taught biology.
The atomic size decreases (with some exceptions) , the ionization energy , electronegativity and electron affinity also increase from left to right.
It decreases as you move from left to right because there is an increase in positive charge in the nucleus as you go from left-to-right. Each time you go over an element it has one more electron and proton added to the principal energy level, so the nucleus pull increases and it holds the valence electron in tighter.
atomic size decreases across a period
At the end of the second period
The answer, assuming compounding once per year and using generic monetary units (MUs), is MU123. In the first year, MU1,200 earning 5% generates MU60 of interest. The MU60 earned the first year is added to the original MU1,200, allowing us to earn interest on MU1,260 in the second year. MU1,260 earning 5% generates MU63. So, MU60 + MU63 is equal to MU123. The answers will be different assuming different compounding periods as follows: Compounding Period Two Years of Interest No compounding MU120.00 Yearly compounding MU123.00 Six-month compounding MU124.58 Quarterly compounding MU125.38 Monthly compounding MU125.93 Daily compounding MU126.20 Continuous compounding MU126.21
That depends on how often it is compounded. For annual compounding, you have $100 * (1 + 5%)2 = $100 * (1.05)2 = $100*1.1025 = $110.25This works because at the end of the first compounding period (year), you've earned interest on the amount at the beginning of the compounding period. At the end of the first year, you have $105.00, and the same at the beginning of the second year. At the end of the second compounding period, you have earned 5%interest on the $105.00 so it is $105 * (1.05) = $100*(1.05)*(1.05) or $100 * 1.052.Compounding more often, will yield a higher number, but not much over a 2 year period. Compounding continuously, for example is $100 * e(2*.05) = $100 * e(.1)= $100 * e(.1) = $100 * 1.10517 = $110.52 (27 cents more).Compounding daily will be close to the continuous function, and compounding monthly or quarterly will be between $110.25 and $110.52
With only one year the value is 11600
I'm thinking of bonds when answering this question. The more frequent the compounding the better it will be for the lender. The less frequent the compounding the better it will be for the borrower. Lets use this example: Interest = 10% Principle = $1000 Compounding A = Annually Compounding B = Quarterly Time period = 2 years A) At the end of the first year $100 in interest would have been made making the balance $1100. At the end of the second year $110 would be earned because of compounding and the balance would be $1210. B) At the end of the first year $103.81 in interest would have been earned with a ending balance of $1103.81. At the end of the second year the interest earned would be $114.59 and the ending balance would be $1218.40. What I showed here is that if you are the one receiving the interest you would prefer daily compounding. When you're paying out interest you would prefer simple interest.
compounding of interest refers to the action wherein, the interest paid to us over a period of time would increase gradually.Ex: Lets say you invest Rs. 10000/- at 10% per annum which is compounded every quarter.So interest for first quarter: Rs. 250/-Principal at the end of first quarter: 10,250/-Interest for second quarter: Rs. 256.25/-Principal at the end of second quarter: 10,506.25/-the increase in interest in the second quarter is because, the interest paid during the first quarter is also considered for interest payment in the second quarter. So, even though the principal amount we invested remains the same the interest varies because of compounding of interest.The shorter the compounding period, greater is the interest earned.Simple interest is to charge interest on the principle amount.compound interest is the interest calculated on the simple interest!
The compound interest formula is FV = P(1+i)^n where FV = Future Value P = Principal i = interest rate per compounding period n = number of compounding periods. Here you will need to calculate i by dividing the nominal annual interest rate by the number of compounding periods per year (that is, i = 4%/12). Also, if the money is invested for 8 years and compounds each month, there will be 8*12 compounding periods. Just plug the numbers into the formula. You can do it!
lowers the frequency.The period is the time for one complete wave
Annual percentage yield (APY) is a normalized representation of an interest rate, based on a compounding period of one year
When a wave period decreases, speed increases.
APY = (1+ period rate)# of period - 1 Where period rate = APR / # of compounding periods in a year
Future Value = (Present Value)*(1 + i)^n {i is interest rate per compounding period, and n is the number of compounding periods} Memorize this.So if you want to double, then (Future Value)/(Present Value) = 2, and n = 16.2 = (1 + i)^16 --> 2^(1/16) = 1 + i --> i = 2^(1/16) - 1 = 0.044274 = 4.4274 %