Introduction

Have you ever wondered how the rich got their wealth and then kept it growing? Do you dream of retiring early (or of being able to retire at all)? Do you know that you should invest, but don't know where to start?There is a point, because unlike trigonometry or calculus, compounding can be applied to everyday life.

What Is Investing?

__Investing__(n-v st ing) is the act of committing money or capital to an endeavor with the expectation of obtaining an additional income or profit (www.investodia.com)

What Investing Is Not

Investing

**is not gambling**.

**compound interest is "the greatest mathematical discovery of all time". There is a point, because unlike trigonometry or calculus, compounding can be applied to everyday life.**

__Albert Einstein said__Miracle compounding ( "compound interest") to change

__money work to be highly powerful__income-generating tool. Compounding is the process of generating revenue from the income generated by an asset direinvestasikan. To do this requires two things: reinvest income and time. The longer the investment period, the greater the ability to accelerate the income potential from the initial investment.

Example:

If you invest $ 10,000 today at 6%, you will have $ 10,600 in one year ($ 10,000 x 1:06). Now let's say that rather than withdraw the $ 600 gained from interest, you keep it in there for another year. If you continue to earn the same rate of 6%, your investment will grow to $ 11,236.00 ($ 10.600 x 1:06) by the end of the second year.

Because you

Starting Early

Consider two individuals, we'll name them Pam and Sam. Both Pam and Sam are the same age. When Pam was 25 she invested $15,000 at an interest rate of 5.5%. For simplicity, let's assume the interest rate was compounded annually. By the time Pam reaches 50, she will have $57,200.89 ($15,000 x [1.055^25]) in her bank account.

Pam's friend, Sam, did not start investing until he reached age 35. At that time, he invested $15,000 at the same interest rate of 5.5% compounded annually. By the time Sam reaches age 50, he will have $33,487.15 ($15,000 x [1.055^15]) in his bank account.

What happened? Both Pam and Sam are 50 years old, but Pam has $23,713.74 ($57,200.89 - $33,487.15) more in her savings account than Sam, even though he invested the same amount of money! By giving her investment more time to grow, Pam earned a total of $42,200.89 in interest and Sam earned only $18,487.15.

You can see that both

source about investing

mama Echa

If you invest $ 10,000 today at 6%, you will have $ 10,600 in one year ($ 10,000 x 1:06). Now let's say that rather than withdraw the $ 600 gained from interest, you keep it in there for another year. If you continue to earn the same rate of 6%, your investment will grow to $ 11,236.00 ($ 10.600 x 1:06) by the end of the second year.

Because you

*reinvested*that $600, it works together with the original**, earning you $636, which is $36 more than the previous year. This little bit extra may seem like peanuts now, but let's not forget that you didn't have to lift a finger to earn that $36. More importantly, this $36 also has the capacity to earn interest. After the next year, your investment will be worth $11,910.16 ($11,236 x 1.06). This time you earned $674.16, which is $74.16 more interest than the first year. This increase in the amount made each year is compounding in action: interest earning interest on interest and so on. This will continue as long as you**__investment____keep reinvesting and earning interest.__Starting Early

Consider two individuals, we'll name them Pam and Sam. Both Pam and Sam are the same age. When Pam was 25 she invested $15,000 at an interest rate of 5.5%. For simplicity, let's assume the interest rate was compounded annually. By the time Pam reaches 50, she will have $57,200.89 ($15,000 x [1.055^25]) in her bank account.

Pam's friend, Sam, did not start investing until he reached age 35. At that time, he invested $15,000 at the same interest rate of 5.5% compounded annually. By the time Sam reaches age 50, he will have $33,487.15 ($15,000 x [1.055^15]) in his bank account.

What happened? Both Pam and Sam are 50 years old, but Pam has $23,713.74 ($57,200.89 - $33,487.15) more in her savings account than Sam, even though he invested the same amount of money! By giving her investment more time to grow, Pam earned a total of $42,200.89 in interest and Sam earned only $18,487.15.

You can see that both

__investments__start to grow slowly and then accelerate, as reflected in the increase in the curves' steepness. Pam's line becomes steeper as she nears her 50s not simply because she has accumulated more**interest**, but because this accumulated interest is itself accruing more interest.source about investing

mama Echa

## 7 comments:

keep post sob

semangat

baca bac disini terus ah

bioar tahu soalinvesting hehehe

investing juga ach..

top info

bisaaaaaaaaaaaaaaaa

great post....

AV,無碼,a片免費看,自拍貼圖,伊莉,微風論壇,成人聊天室,成人電影,成人文學,成人貼圖區,成人網站,一葉情貼圖片區,色情漫畫,言情小說,情色論壇,臺灣情色網,色情影片,色情,成人影城,080視訊聊天室,a片,A漫,h漫,麗的色遊戲,同志色教館,AV女優,SEX,咆哮小老鼠,85cc免費影片,正妹牆,ut聊天室,豆豆聊天室,聊天室,情色小說,aio,成人,微風成人,做愛,成人貼圖,18成人,嘟嘟成人網,aio交友愛情館,情色文學,色情小說,色情網站,情色,A片下載,嘟嘟情人色網,成人影片,成人圖片,成人文章,成人小說,成人漫畫,視訊聊天室,a片,線上遊戲,色情遊戲,日本a片,性愛

Great investing news.

## Post a Comment