A random variable X is normally distributed with mu=60 and sigma = 3. What is the value of 2 numbers a,b so that P(X=a)=P(X=b). The solution is a=60 and b=65. However, I do not know how to come up with that answer. As far as I understand P(X=a) and P(X=b) have to be both 0 since you always have to give a range e.g. P(a<X). Moreover if I insert the values 60 and 65 in the formula Z=(X−mu)/sigma than I would end up with 0,1.667 and z-scores 0.5, 0.952 respectively.

What is the range of the function ${\displaystyle y=x^2}$?

The domain and range of $y=\sin <!--\; \; -->x$ is
A)$R,[0,\mathrm{\infty <!--\; \infty \; -->}]$
B)$R,[-<!--\; -\; -->1,1]$
C)$R,[-<!--\; -\; -->\mathrm{\infty <!--\; \infty \; -->},\mathrm{\infty <!--\; \infty \; -->}]$
D)$R,[1,\mathrm{\infty <!--\; \infty \; -->}]$

Mean of the squares of the deviations from mean is called the:
Variance
Standard deviation
Quartile deviation
Mode

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