Multiply and then simply by factoring (√2y)(√3)(√8y)
do you mean
(√2y)(√3)(√8y)
=[(2y)^0.5][(3)^0.5][(8y)^0.5]
???????
If so,it is (√48)y=(4√3)y
(�ã2y*�ã8y*�ã3=�ã(2*8*y^2)*�ã3=�ã(16*y^2)*�ã3
=-4y*�ã3
OR
=4y*�ã3
Becouse �ã16= -4 OR 4 and �ãy^2=y
sqrt(48)*y = 4*sqrt3*y
I am unable to view the square root symbols used by Bosnian and Marco.
Different country's keyboards seem to have different ASCII symbol assignments. I often have this problem in internet cafes of foreign countries.
To multiply and simplify the expression (√2y)(√3)(√8y), we can follow these steps:
Step 1: Multiply the terms inside the parentheses.
(√2y)(√3)(√8y) = √(2y) × √3 × √(8y)
Step 2: Simplify the square roots.
√(2y) = √2 × √y
√(8y) = √(4 × 2 × y) = √4 × √2 × √y
Step 3: Combine like terms.
√2 × √2 × √3 × √y × √y = √(2 × 2 × 3 × y × y)
Step 4: Simplify the expression further.
√(2 × 2 × 3 × y × y) = √(12y^2)
Step 5: Simplify the square root of 12.
√(12y^2) = √(4 × 3 × y^2) = 2y√3
Therefore, (√2y)(√3)(√8y) simplifies to 2y√3.