Subtract 11V19 - 5V19. (1 point)
11V19 - 5V19 = 6V19
Multiply (5v19) (6v2). Give an exact answer. (1 point)
To multiply (5v19) (6v2), we can use the distributive property.
(5v19) (6v2) = 5v19 * 6 + 5v19 * 2
= 30v19 + 10v19
= 40v19
Divide V95/ 3V5. Provide an exact number
To divide V95 by 3V5, we can rationalize the denominator by multiplying both the numerator and denominator by the conjugate of 3V5, which is 3V5.
So, V95 / 3V5 = (V95 * 3V5) / (3V5 * 3V5)
= (3V95V5) / (9V5^2)
= (3V475V) / (9 * 5)
= V475 / 15
Therefore, the exact result is V475 / 15.
Divide 36V39/ 9V13
• Provide an exact answer. (1 point)
To divide 36V39 by 9V13, we can rationalize the denominator by multiplying both the numerator and denominator by the conjugate of 9V13, which is 9V13.
So, 36V39 / 9V13 = (36V39 * 9V13) / (9V13 * 9V13)
= (324V3V39V13) / (81V13^2)
= (324V3V507) / (81 * 13)
= V3V507 / 13 * 4
= V169 * V3V3 / (13 * 4)
= V169 * 3 / (13 * 4)
= V507 / 52
Therefore, the exact result is V507 / 52.
Simplify v48. (1 point)
To simplify V48, we can look for perfect square factors of 48.
We see that 48 can be factored as 16 * 3.
So, V48 = V16 * V3 = 4V3.
Therefore, the simplified form of V48 is 4V3.
Simplify ^3V54
Note: You will find the option to add a cubic root symbol in the Algebra (X) keyboard.