Binary Month Overview

Best Binary Options Brokers 2020:
  • BINARIUM
    BINARIUM

    Top Binary Options Broker 2020!
    Best For Beginners!
    Free Trading Education!
    Free Demo Account!
    Get Your Sign-Up Bonus Now:

  • BINOMO
    BINOMO

    Only For Experienced Traders.

Online Trading with Binary.com

Trade 24/7, even on weekends.

Create free account with

Diverse platforms and account types

Trade binary options on a wide range of web and mobile apps. Each comes with unique strengths that complement a variety of trading strategies.

Trade binary options on a wide range of web and mobile apps. Each comes with unique strengths that complement a variety of trading strategies.

Practice account with replenishable USD 10,000 virtual credit.

Real-money accounts with your choice of fiat and crypto currency.

Trade Forex and CFDs on our popular multi-asset platform.

Trade Forex and CFDs on our popular multi-asset platform.

Practice account with replenishable USD 10,000 virtual credit.

MT5 real-money account for Forex and CFDs.

MT5 real-money account for Synthetic Indices only.

Choose the platforms and accounts you need, based on your personal trading style

Trade in the world’s financial markets

Options that offer a fixed payout based on a simple yes/no proposition.

Best Binary Options Brokers 2020:
  • BINARIUM
    BINARIUM

    Top Binary Options Broker 2020!
    Best For Beginners!
    Free Trading Education!
    Free Demo Account!
    Get Your Sign-Up Bonus Now:

  • BINOMO
    BINOMO

    Only For Experienced Traders.

Major, minor and exotic currency pairs.

Cryptocurrency pairs including Bitcoin, Ethereum, and Litecoin.

Financial derivatives that allow you to trade on the movement of underlying assets.

Precious metal pairs including gold and platinum.

Options that let you “look back” on the optimum high or low achieved by the market to determine the payout.

Choose from 100+ tradable instruments, backed by award-winning technology and innovation since 2000.

Award-winning trading excellence

Payment methods

We support hundreds of deposit and withdrawal options, including Bitcoin.

Our Company

Education

Banking

Trading

Partner With Us

In the EU, financial products are offered by Binary Investments (Europe) Ltd., W Business Centre, Level 3, Triq Dun Karm, Birkirkara, BKR 9033, Malta, regulated as a Category 3 Investment Services provider by the Malta Financial Services Authority (licence no. IS/70156).

Outside the EU, financial products are offered by Binary (SVG) LLC, Hinds Building, Kingstown, St. Vincent and the Grenadines; Binary (V) Ltd, Govant Building, Port Vila, PO Box 1276, Vanuatu, regulated by the Vanuatu Financial Services Commission (view licence); Binary (BVI) Ltd, Kingston Chambers, P.O. Box 173, Road Town, Tortola, British Virgin Islands, regulated by the British Virgin Islands Financial Services Commission (licence no. SIBA/L/18/1114); and Binary (FX) Ltd., Lot No. F16, First Floor, Paragon Labuan, Jalan Tun Mustapha, 87000 Labuan, Malaysia, regulated by the Labuan Financial Services Authority to carry on a money-broking business (licence no. MB/18/0024).

This website’s services are not made available in certain countries such as the USA, Canada, Hong Kong, Japan, or to persons under age 18.

The products offered via this website include binary options, contracts for difference (“CFDs”) and other complex derivatives. Trading binary options may not be suitable for everyone. Trading CFDs carries a high level of risk since leverage can work both to your advantage and disadvantage. As a result, the products offered on this website may not be suitable for all investors because of the risk of losing all of your invested capital. You should never invest money that you cannot afford to lose, and never trade with borrowed money. Before trading in the complex products offered, please be sure to understand the risks involved and learn about Responsible Trading.

In the EU, financial products are offered by Binary Investments (Europe) Ltd., W Business Centre, Level 3, Triq Dun Karm, Birkirkara, BKR 9033, Malta, licensed and regulated as a Category 3 Investment Services provider by the Malta Financial Services Authority (licence no. IS/70156).

In the Isle of Man and the UK, Synthetic Indices are offered by Binary (IOM) Ltd., First Floor, Millennium House, Victoria Road, Douglas, IM2 4RW, Isle of Man, British Isles; licensed and regulated respectively by (1) the Gambling Supervision Commission in the Isle of Man (current licence issued on 31 August 2020) and by (2) the Gambling Commission in the UK (licence reference no: 39172).

In the rest of the EU, Synthetic Indices are offered by Binary (Europe) Ltd., W Business Centre, Level 3, Triq Dun Karm, Birkirkara, BKR 9033, Malta; licensed and regulated by (1) the Malta Gaming Authority in Malta (licence no. MGA/B2C/102/2000 issued on 01 August 2020), for UK clients by (2) the UK Gambling Commission (licence reference no: 39495), and for Irish clients by (3) the Revenue Commissioners in Ireland (Remote Bookmaker’s Licence no. 1010285 issued on 1 July 2020). View complete Regulatory Information.

Binary.com is an award-winning online trading provider that helps its clients to trade on financial markets through binary options and CFDs. Trading binary options and CFDs on Synthetic Indices is classified as a gambling activity. Remember that gambling can be addictive – please play responsibly. Learn more about Responsible Trading. Some products are not available in all countries. This website’s services are not made available in certain countries such as the USA, Canada, Hong Kong, or to persons under age 18.

Trading binary options may not be suitable for everyone, so please ensure that you fully understand the risks involved. Your losses can exceed your initial deposit and you do not own or have any interest in the underlying asset.

CFDs are complex instruments and come with a high risk of losing money rapidly due to leverage. 78.6% of retail investor accounts lose money when trading CFDs. You should consider whether you understand how CFDs work and whether you can afford to take the high risk of losing your money.

What Happened Last Month?

European currency has positive dynamics

Consumer prices in Germany and Eurozone declined in January that did not prevent demonstrating positive dynamics by the single European currency last week. Its recovery was associated with profit-taking on the background of technical oversold, as well as purchases of the euro against the Swiss franc. There was not any negative reaction after the release of data on consumer price inflation, as the European Central Bank has launched a program of quantitative easing aimed at combating deflation. However, the downward trend in EURUSD remains in force and the traders will use it to sell the pair.

Positive numbers in UK economy

The growth of the UK economy in the 4th quarter of last year amounted to 0.5% q/q and 2.7% in a year. These data have not held up to the predicted values adding negative to the British pound, which is paired with the US dollar fell to 1.4990. It’s oversold facilitated the return above the breached support at around 1.5040, but it is not necessary to say about the formation of the base in the pair. After dropping an interest rate by Bank of Canada, the Canadian dollar has been completely dominated by bears. US dollar in tandem with it renewed a maximum and tested the resistance at 1.2795. Looney looks oversold but oil quotations show a positive trend, which increases the risks of CAD correction, although signs of the downtrend completion are still there.

Interest rate remains the same in Reserve Bank of New Zealand

The Reserve Bank of New Zealand did not lower the interest rate, but in its comments admitted the possibility of a rate reduction at the next meeting. Market participants reacted to the new wave of sales of the New Zealand dollar, which in tandem with the US dollar has updated a minimum, falling to 0.7215. New Zealand central bank’s comments and actions of the Canadian regulator raised expectations of similar action by the Reserve Bank of Australia at the upcoming meeting this week. In addition, the consumer price index in Australia came below analysts’ forecasts, reinforcing expectations of easing monetary policy by the Australian central bank. US Federal Reserve decision to leave interest rates unchanged was widely anticipated. In the comments, it was noted that the Fed will not rush to increase rates, but gave a positive assessment of the US economy, which ultimately supported the US dollar.

Binary numbers – Conversion formulas and mathematical operations

In this section we will explain what binary is and show you how to convert between binary and decimal (denary) numbers.

We will also show you how to perform various mathematical operations on binary numbers, including multiplication and division.

Binary Numbers Overview

Binary is a number system used by digital devices such as computers, smartphones and tablets. It is also used in digital audio devices such as cd players and MP3 players. Electronically binary numbers are stored/processed using off or on electrical pulses, a digital system will interpret these off and on states as 0 and 1. In other words if the voltage is low then it would represent 0 (off state), and if the voltage is high then it would represent a 1 (on state). Binary is Base 2, unlike our counting system decimal which is Base 10 (denary).

In other words, Binary has only 2 different numerals (0 and 1) to denote a value, unlike Decimal which has 10 numerals (0,1,2,3,4,5,6,7,8 and 9).

Here is an example of a binary number: 10011100

As you can see it is simply a bunch of zeroes and ones, there are 8 numerals in all which make this an 8 bit binary number. Bit is short for B inary Dig it , and each numeral is classed as a bit.

The bit on the far right, in this case a 0 , is known as the Least significant bit (LSB) .

The bit on the far left, in this case a 1 , is known as the Most significant bit (MSB) notations used in digital systems:
4 bits = Nibble
8 bits = Byte
16 bits = Word
32 bits = Double word
64 bits = Quad Word (or paragraph) When writing binary numbers you will need to signify that the number is binary (base 2), as an example let’s take the value 101 . As it is written, it would be hard to work out whether it is a binary or decimal (denary) value. To get around this problem it is common to denote the base to which the number belongs by writing the base value with the number, for example:

101 2 is a binary number and 101 10 is a decimal (denary) value.

Once we know the base then it is easy to work out the value, for example:

1012 = 1*2 2 + 0*2 1 + 1*2 0 = 5 (five)

10110 = 1*10 2 + 0*10 1 + 1*10 0 = 101 (one hundred and one)

One other thing about binary numbers is that it is common to signify a negative binary value by placing a 1 (one) at the left hand side (most significant bit) of the value. This is called a sign bit , we will discuss this in more detail below.

Converting binary to decimal

To convert binary into decimal is very simple and can be done as shown below:

Say we want to convert the 8 bit value 10011101 into a decimal value, we can use a formula table like that below:

128 64 32 16 8 4 2 1
1 0 0 1 1 1 0 1

As you can see, we have placed the numbers 1, 2, 4, 8, 16, 32, 64, 128 (powers of two) in reverse numerical order, and then written the binary value below.

To convert, you simply take a value from the top row wherever there is a 1 below and then add the values together.

For instance, in our example we would have 128 + 16 + 8 + 4 + 1 = 157 .

For a 16 bit value you would use the decimal values 1, 2, 4, 8, 16, 32, 64, 128, 256, 512, 1024, 2048, 4096, 8192, 16384, 32768 (powers of two) for the conversion.

Because we know binary is base 2 then the above could be written as:

1*2 7 + 0*2 6 + 0*2 5 + 1*2 4 + 1*2 3 + 1*2 2 + 0*2 1 + 1*2 0 = 157 .

Converting decimal to binary

To convert decimal to binary is also very simple, you simply divide the decimal value by 2 and then write down the remainder. Repeat this process until you cannot divide by 2 anymore, for example let’s take the decimal value 157:

157 ÷ 2 = 78
78 ÷ 2 = 39
39 ÷ 2 = 19
19 ÷ 2 = 9
9 ÷ 2 = 4
4 ÷ 2 = 2
2 ÷ 2 = 1
1 ÷ 2 = 0
with a remainder of 1
with a remainder of 0
with a remainder of 1
with a remainder of 1
with a remainder of 1
with a remainder of 0
with a remainder of 0
with a remainder of 1
10011101 = 157

Adding binary numbers

Adding binary numbers is very similar to adding decimal numbers, first an example:

Let’s look at the above example step by step:

1 + 1 = 0 (carry one)
1 + 1 (+ the carry) = 1 (carry one)
0 + 1 (+ the carry) = 0 (carry one)
1 + 0 (+ the carry) = 0 (carry one)
1 + 0 (+ the carry) = 0 (carry one)
0 + 1 (+ the carry) = 0 (carry one)
1 + 0 (+ the carry) = 0 (carry one)

The last carry is placed at the left hand side of the result giving: 10000010

Subtracting binary numbers

The most common way of subtracting binary numbers is done by first taking the second value (the number to be subtracted) and apply what is known as two’s complement , this is done in two steps:

  1. complement each digit in turn (change 1 for 0 and 0 for 1).
  2. add 1 (one) to the result.

note: the first step by itself is known as one’s complement .

By applying these steps you are effectively turning the value into a negative number, and as when dealing with decimal numbers, if you add a negative number to a positive number then you are effectively subtracting to the same value.

In other words 25 + (-8) = 17, which is the same as writing 25 – 8 = 17.

An example, let’s do the following subtraction 11101011 – 01100110 (23510 – 10210) note: When subtracting binary values it is important to maintain the same amount of digits for each number, even if it means placing zeroes to the left of the value to make up the digits. For instance, in our example we have added a zero to the left of the value 1100110 to make the amount of numerals up to 8 (one byte) 01100110 . First we apply two’s complement to 01100110

which gives us 10011010 .

Now we need to add 11101011 + 10011010 , however when you do the addition you always disregard the last carry, so our example would be:

which gives us 10000101 , now we can convert this value into decimal, which gives 13310

So the full calculation in decimal is 23510 – 10210 = 13310 (correct!)

Negative numbers

The above example is subtracting a smaller number from a larger number.

If you want to subtract a larger number from a smaller number (giving a negative result), then the process is slightly different.

Usually, to indicate a negative number, the most significant bit (left hand bit) is set to 1 and the remaining 7 digits are used to express the value. In this format the MSB is referred to as the sign bit .

Here are the steps for subtracting a large number from a smaller one (negative result).

  1. Apply two’s complement to the larger number.
  2. Add this value to the smaller number.
  3. Change the sign bit (MSB) to zero.
  4. Apply two’s complement to value to get final result.
  5. The most significant bit (sign bit) now indicates the value is negative.

For example let’s do the following subtraction 10010101 – 10110100 (14910 – 18010)

The process is as follows:

Now we can convert this value into a negative decimal, which gives -31 10

So, the full calculation in decimal is 14910 – 18010 = -3110 (correct!)

Multiplying binary numbers

Binary multiplication can be achieved in a similar fashion to multiplying decimal values.

Using the long multiplication method, ie, by multiplying each digit in turn and then adding the values together.

For example, lets do the following multiplication: 1011 x 111 (decimal 11 10 x 7 10)

which gives us 1001101 , now we can convert this value into decimal, which gives 77 10

So the full calculation in decimal is 11 10 x 7 10 = 77 10 (correct !!) note: Notice the pattern in the partial products, as you can see multiplying a binary value by two can be achieved by shifting the bits to the left and adding zeroes to the right.

Dividing binary numbers

Like multiplication, dividing binary values is the same as long division in decimal.

For example, lets do the following division: 1001 ÷ 11 (decimal 9 10 ÷ 3 10)

which gives us 0011 , now we can convert this value into decimal, which gives 3 10

So the full calculation in decimal is 9 10 ÷ 3 10 = 3 10 (correct!) note: Dividing a binary value by two can also be achieved by shifting the bits to the right and adding zeroes to the left.

Best Binary Options Brokers 2020:
  • BINARIUM
    BINARIUM

    Top Binary Options Broker 2020!
    Best For Beginners!
    Free Trading Education!
    Free Demo Account!
    Get Your Sign-Up Bonus Now:

  • BINOMO
    BINOMO

    Only For Experienced Traders.

Like this post? Please share to your friends:
Binary Options Theory and Practice
Leave a Reply

;-) :| :x :twisted: :smile: :shock: :sad: :roll: :razz: :oops: :o :mrgreen: :lol: :idea: :grin: :evil: :cry: :cool: :arrow: :???: :?: :!: