l ~7 AND ~8
<-- Enter first number or binary
<-- Enter second number or binary (not needed for NOT operation)
        

Perform the bitwise operation AND

on the numbers ~7 & ~8

Convert to binary form

Since Number 1 of 7 is not in binary form, we need to convert it to binary format

From this conversion, we get 111 as our binary number

Convert to binary form

Since Number 2 of 8 is not in binary form, we need to convert it to binary format

From this conversion, we get 1000 as our binary number

Handle negation sign

For 1, switch all 1's with 0's and all 0's with 1's

10

10

10

Our negation number is 000

Handle negation sign

For 2, switch all 1's with 0's and all 0's with 1's

10

01

01

01

Our negation number is 0000111

Make sure each of binary term has a length of 4,
the length of our longest binary number

Digit 1:  0000 AND 0111

For a bitwise AND operation, both bit 1 AND bit 2 need to be 1

For bit 1, this is not the case:  0 AND 0 = 0

Digit 2:  0000 AND 0111

For a bitwise AND operation, both bit 1 AND bit 2 need to be 1

For bit 2, this is not the case:  0 AND 1 = 0

Digit 3:  0000 AND 0111

For a bitwise AND operation, both bit 1 AND bit 2 need to be 1

For bit 3, this is not the case:  0 AND 1 = 0

Digit 4:  0000 AND 0111

For a bitwise AND operation, both bit 1 AND bit 2 need to be 1

For bit 4, this is not the case:  0 AND 1 = 0

This operation is shown below:

  0000
AND 0111
= 0000

Final Answer:

Using our binary calculator, we can convert 00001110000 to an integer.