let look at it and figure it out.. 1111 means the following first number on the right is the number of 2^0s which is 1 next number is the number of 2^1 powers or 2's next is the number of 2^2 =4s next is the number of 2^3=8 s So we have 1+2+4+8=15
That looks as if it already IS in base ten. If it isn't, you should know (and specify, if you ask) the base, before you can convert it.
26
1111 1111 base 2
Convert the base 10 numeral to a numeral in the base indicated. 503 to base 5
That looks like hexadecimal. Convert each hex digit to 4 binary digits: B = 1011, 2 = 0010, F = 1111, so the final result is 1011 0010 1111.That looks like hexadecimal. Convert each hex digit to 4 binary digits: B = 1011, 2 = 0010, F = 1111, so the final result is 1011 0010 1111.That looks like hexadecimal. Convert each hex digit to 4 binary digits: B = 1011, 2 = 0010, F = 1111, so the final result is 1011 0010 1111.That looks like hexadecimal. Convert each hex digit to 4 binary digits: B = 1011, 2 = 0010, F = 1111, so the final result is 1011 0010 1111.
1111 from base 2 to base 10...Working from right to left - each of the above digits is twice its neighbour. Therefore, you have 8+4+2+1 which equals 15
1111 = 15
That looks as if it already IS in base ten. If it isn't, you should know (and specify, if you ask) the base, before you can convert it.
26
It is 2000 + 30 + 2 and in base ten, that is 2032.
Commonly numbers are base 10 already.
2212
1111 1111 base 2
Convert the base 10 numeral to a numeral in the base indicated. 503 to base 5
1111 or 00001111
1110
That looks like hexadecimal. Convert each hex digit to 4 binary digits: B = 1011, 2 = 0010, F = 1111, so the final result is 1011 0010 1111.That looks like hexadecimal. Convert each hex digit to 4 binary digits: B = 1011, 2 = 0010, F = 1111, so the final result is 1011 0010 1111.That looks like hexadecimal. Convert each hex digit to 4 binary digits: B = 1011, 2 = 0010, F = 1111, so the final result is 1011 0010 1111.That looks like hexadecimal. Convert each hex digit to 4 binary digits: B = 1011, 2 = 0010, F = 1111, so the final result is 1011 0010 1111.