Multiply 9√3 6√7
To multiply expressions with square roots, you can apply the distributive property. Let's multiply 9√3 by 6√7:
Step 1: Multiply the numbers outside the radicals
9 * 6 = 54
Step 2: Multiply the numbers inside the radicals
√3 * √7 = √(3 * 7) = √21
Step 3: Combine the results from steps 1 and 2
54 * √21 = 54√21
Therefore, the product of 9√3 and 6√7 is 54√21.
To multiply 9√3 and 6√7, you can follow these steps:
Step 1: Multiply the coefficients (numbers in front of the square roots). 9 multiplied by 6 equals 54.
Step 2: Multiply the square roots. √3 multiplied by √7 is √(3*7) = √21.
Step 3: Combine the results from step 1 and step 2. Therefore, 9√3 multiplied by 6√7 equals 54√21.
To multiply 9√3 and 6√7, you can follow the basic rules of multiplication for radicals:
9√3 * 6√7
First, multiply the numerical coefficients:
9 * 6 = 54
Then, multiply the radicals:
√3 * √7 = √(3*7) = √21
Now combine the numerical coefficient and the radical:
54√21
So, 9√3 * 6√7 = 54√21.