how can you represent the repeating decimal 0.3 (0.333333) as a
1.333333333333333 As A Fraction. 6 ‾ by 10 10 to create the second equation. 3 ‾ create two equations where the only numbers to the right of the decimal place are the repeating part.
how can you represent the repeating decimal 0.3 (0.333333) as a
9x = 6 9 x = 6 divide each term in 9x = 6 9 x = 6 by 9 9 and simplify. Set up an equation with 0.¯3 0. (1) 1 is the integer and the fractional part is 0.33333333333 for the sake of ease let us consider on multiplying both sides by 10 in equation (2) we get so from equation (1) we get so the fraction for 1.33333333333 is for more information please refer to the link below. Web 1.333333333 is a fraction. 3 ‾ create two equations where the only numbers to the right of the decimal place are the repeating part. However, that does not stop it being a fraction. Web 1.33333333333 = 1 + 0.33333333333. 3 ‾ by 10 10 to create the second equation. As we have 8 digits after the decimal point in the numerator, we need to multiply both the numerator and denominator by 10 8 = 100000000, so that there is no decimal point in the numerator. X = 0.¯3 x = 0.
Web to convert 1.33333333 to fraction, follow these steps: Web convert to a simplified fraction 1.333333333 | mathway algebra examples popular problems algebra 1.¯3 1. However, that does not stop it being a fraction. 6 ‾ subtract x = 0.¯6 x = 0. Web to convert 1.33333333 to fraction, follow these steps: Web 1.333333333333333 as fraction simplist form 0. 6 ‾ to remove the repeating part. However, that does not stop it being a fraction. 1.333333333333333 as fraction simplist form. It is a fraction in decimal form rather than in the form of a ratio. 6 ‾ by 10 10 to create the second equation.
