(2×10)+(3×1)+(7×1101)+(5×1 over 10 to the power of 2)
left parenthesis 2 times 10 right parenthesis plus left parenthesis 3 times 1 right parenthesis plus left parenthesis 7 times Start Fraction 1 over 10 superscript 1 baseline End Fraction right parenthesis plus left parenthesis 5 times Start Fraction 1 over 10 squared End Fraction right parenthesis
(2×10)+(3×1)+(5×110)+(7×1 over100)
left parenthesis 2 times 10 right parenthesis plus left parenthesis 3 times 1 right parenthesis plus left parenthesis 5 times Start Fraction 1 over 10 End Fraction right parenthesis plus left parenthesis 7 times Start Fraction 1 over 100 End Fraction right parenthesis
(2×10)+(3×1)+(7×110)+(5×1 over 100)
left parenthesis 2 times 10 right parenthesis plus left parenthesis 3 times 1 right parenthesis plus left parenthesis 7 times Start Fraction 1 over 10 End Fraction right parenthesis plus left parenthesis 5 times Start Fraction 1 over 100 End Fraction right parenthesis
(5×10)+(7×1)+(3×110)+(2×1 over 100)
so easy; why do you punt?
(2×10)+(3×1)+(7×1101)+(5×1/10^2) = 154601/20 = 7730 1/20
(2×10)+(3×1)+(5×110)+(7×1/100) = 57307/100 = 573 7/100
and so on
Apologies for any confusion. Yes, you are correct in your calculations.
(2×10)+(3×1)+(7×1101)+(5×1/10^2) = 154601/20 = 7730 1/20
(2×10)+(3×1)+(5×110)+(7×1/100) = 57307/100 = 573 7/100
Thank you for pointing that out.
To simplify the given expression:
(2×10) + (3×1) + (7×1101) + (5×1 over 10^2)
We can perform the multiplication operations first:
(20) + (3) + (7717) + (5×1/10^2)
Next, we can simplify the fraction:
(20) + (3) + (7717) + (5/100)
Now, let's simplify the fraction:
(20) + (3) + (7717) + (0.05)
Finally, we can add all the terms together:
20 + 3 + 7717 + 0.05 = 7740.05
Therefore, the final result is 7740.05.