6/7 x 2/3 = 0.5714 6/7 times 2/3 as a decimal is 0.5714 where, 6/7 is the multiplicand, 2/3 is the multiplier, 4/7 is the simplest form of 6/7 times 2/3, 0.5714 is the decimal form of 6/7 times 2/3. Important Notes: 6/7 * 2/3 All the following questions represent 6/7 times 2/3 in fraction form, so it's very much important to observe the Yes, you can take that approach. But, your work is incomplete. When you simplify a square root, you need to ensure you have removed all perfect squares. With 3√8, you still have a perfect square inside the radical. 3√8 = 3√ (4*2) = 3√4 * √2 = 3*2√2 = 6√2. Hope this helps. Simplify the following expression into its simplest form. \frac{x^{3} + 4x^{2}y + 4xy^{2} + 2xy - 6y^{2{x + 2y} How do you write 34/100 in simplest form? Write the ratio 16:24 in simplest form : 1. 1:2 2. 4:3 3. 3:4 4. 2:3; Multiply and express in simplest form: (x - 5 / 2 )^3 times (1 / x - 5 )^2. Write in simplest form. \sqrt{\sin^2 x 2/3 x 5/9 = 10/27. 2/3 times 5/9 is equal to 10/27 in fraction and 0.3704 in decimal form. 2/3 times 5/9 in fraction form: 2/3 x 5/9 = ? Arrange the fractions in the product expression form as like the below: = 2/3 x 5/9. = (2 x 5)/ (3 x 9) Check the numerator and denominator and cancel if anything cancelled each other: = 10/27. Example: Both 15 and 21 share two common factors: 1 and 3. The GCF for the two terms of the original ratio is 3. 5. Divide both terms by the greatest common factor. Since both terms of the original ratio contain the GCF, you can divide each term by that number and come up with whole numbers as a result. Instead of using decimal representation, the standard way to write such a number is to use simplified radical form, which involves writing the radical with no perfect squares as factors of the number under the root symbol. Let a a be a positive non-perfect square integer. In this form \sqrt {a}=b\sqrt {c} a = b c, both b b and c c are positive 0Igu.

2 3 times 2 3 in simplest form