If 3= 9b/a ,What is a/b equal to ?
1/3 = b/a
so
a/b = 3/1 which is 3
Well, it looks like a puzzling math problem. To find out what a/b is equal to, we can follow the strategy of "dividing and conquering." Since 3 equals 9b divided by a, we can rearrange the equation to get a/b on one side. So, if we divide both sides of the equation by 3, we have:
3/3 = (9b/a) / 3
1 = 3b/a
Finally, if we multiply both sides by a, we get:
a = 3b
And if we divide both sides by b, we get:
a/b = 3
So, a/b is equal to 3.
To find the value of a/b, we can rearrange the equation 3 = 9b/a:
1. Multiply both sides of the equation by a: 3a = 9b.
2. Divide both sides of the equation by 9: (3a)/9 = b.
3. Simplify the left side of the equation: a/3 = b.
4. Rearrange the equation to solve for a/b: a/b = (a/3) / 1.
So, the value of a/b is equal to a/3.
To find the value of a/b, we can rearrange the given equation:
3 = 9b/a
First, let's isolate the variable b. Multiply both sides of the equation by a:
3a = 9b
Next, divide both sides by 9:
(3a)/9 = b
Simplifying the left side:
a/3 = b
To find the value of a/b, we divide a by b:
a/b = a/(a/3)
Dividing by a is equivalent to multiplying by its reciprocal (1/a):
a/b = a * (3/a)
Now, we can cancel out the common factor "a":
a/b = 3
Therefore, a/b is equal to 3.