Find a number equal to 100 times its reciprocal
x = 100(1/x)
x^2 = 100
x = ± 10
X is equal to 10
What is the answer
x=100
100=1/x
100×1=x
100=x
√100
10
x=10
X=100x1divide x
X=100 divide x
X divide 1 is equal to 100 divide one
Therefore x*2 =100
X=10
x=100x1/x
x power 2 =(100x1/x)2
=dis ez u can complete now
To find a number that is equal to 100 times its reciprocal, we can start by setting up an equation.
Let's call the number we're looking for "x."
According to the problem, we know that the number is equal to 100 times its reciprocal. We can express this mathematically as:
x = 100 * (1/x)
To solve this equation, we can start by multiplying both sides of the equation by x:
x * x = 100 * (1/x) * x
Simplifying, we have:
x^2 = 100 * 1
x^2 = 100
Taking the square root of both sides, we have:
√(x^2) = √100
x = ±10
So, the number we're looking for is either 10 or -10, both of which are equal to 100 times their reciprocal.