Answered

Connect with knowledgeable individuals and find the best answers at IDNLearn.com. Ask anything and receive immediate, well-informed answers from our dedicated community of experts.

i) [tex](11001101)_2=(?)_{16}[/tex]

ii) [tex](524)_{10}=(?)_2[/tex]

iii) [tex](1010)_2 \times(110)_2-(1011)_2=(?)_2[/tex]

iv) [tex](10110)_2 \div(101)_2[/tex]

Sagot :

GinnyAnsweridn
Certainly! Let's go through each part step-by-step:

### Part i) Convert binary to hexadecimal:
Given a binary number \( (11001101)_2 \):

1. Group the binary digits into sets of four, starting from the right: 1100 1101.
2. Convert each group to its hexadecimal equivalent:
- \( 1100 \) in binary is \( C \) in hexadecimal.
- \( 1101 \) in binary is \( D \) in hexadecimal.

Therefore, \( (11001101)_2 = (CD)_{16} \).

### Part ii) Convert decimal to binary:
Given a decimal number \( (524)_{10} \):

1. Divide the number by 2 and record the quotient and remainder.
2. Continue dividing the quotient by 2 until the quotient is zero.
3. The binary representation is the sequence of remainders read from bottom to top.

Following this method, we obtain:
Therefore, \( (524)_{10} = (1000001100)_2 \).

### Part iii) Perform binary multiplication, then subtraction:
Given:
- \( (1010)_2 \) (binary number 1)
- \( (110)_2 \) (binary number 2)

1. Perform binary multiplication:
- Multiply \( (1010)_2 \times (110)_2 \).

2. Convert each binary number to decimal:
- \( 1010_2 = 10_{10} \)
- \( 110_2 = 6_{10} \)

Their product in decimal is 10 * 6 = 60.

3. Convert the decimal product back to binary:
- \( 60_{10} = 111100_2 \)

Next:
- Subtract \( (1011)_2 \) from the product \( (111100)_2 \).

4. Convert to decimal:
- \( 1011_2 = 11_{10} \)
- The product is \( 60_{10} \)

5. Perform the subtraction in decimal:
- \( 60 - 11 = 49_{10} \)

6. Convert the result back to binary:
- \( 49_{10} = 110001_2 \)

Therefore:
[tex]\[ (1010)_2 \times (110)_2 - (1011)_2 = (110001)_2 \][/tex]

### Part iv) Perform binary division:
Given:
- \( (10110)_2 \) (binary number 1)
- \( (101)_2 \) (binary number 2)

1. Convert both binary numbers to decimal:
- \( 10110_2 = 22_{10} \)
- \( 101_2 = 5_{10} \)

2. Perform the division in decimal:
- \( 22 \div 5 = 4 \) (integer division)

3. Convert the quotient back to binary:
- \( 4_{10} = 100_2 \)

Therefore:
[tex]\[ (10110)_2 \div (101)_2 = (100)_2 \][/tex]

### Summary:
i) \((11001101)_2 = (CD)_{16} \)

ii) \((524)_{10} = (1000001100)_2 \)

iii) \((1010)_2 \times(110)_2-(1011)_2 = (110001)_2 \)

iv) [tex]\((10110)_2 \div(101)_2 = (100)_2 \)[/tex]
We appreciate every question and answer you provide. Keep engaging and finding the best solutions. This community is the perfect place to learn and grow together. For trustworthy answers, rely on IDNLearn.com. Thanks for visiting, and we look forward to assisting you again.