describe what this means in practical terms. f(x)=(150x+120)/(0.05x+1) the number of bass. f(x), months in a lake that was stocked with 120 bass.

Need to find a variable.
$ax+by=cx+z$
solve for x

To calculate: The number of days after which, 250 students are infected by flu virus in the college campus containing 5000 students. If one student returns from vacation with contagious and long- lasting flu virus and spread of flu virus is modeled by ${\displaystyle y=\frac{5000}{1+4999e^{-0.8t}},t\ge 0}$.
Where, yis the total number of students infected after days.

$f:R->R$
$f(x)=8x-2$
$f(a)=f(b)$
${\displaystyle a,b\in R}$
Prove that f is one-to-one.

Find the x-and y-intercepts of the graph of the equation algebraically.
${\displaystyle y=-5x+6}$

I've never fully understood the connection between Riemann surfaces and algebraic varieties. I'm particularly interested in the case of the modular curve of level N--I know how the Riemann surface is constructed by taking a quotient of the upper half-plane by the action of a congruence subgroup of the modular group, but not how the resulting manifold translates into a curve. From what I've read, it appears that the associated curve is defined by equations satisfied by functions defined on the manifold, but I don't understand which functions are involved in these equations. What exactly is the relation between the two types of objects?

h is related to one of the parent functions described in this chapter. Describe the sequence of transformations from f to h.
${\displaystyle h\left(x\right)=-\sqrt{x+4}}$

Qualitatively (or mathematically "light"), could someone describe the difference between a matrix and a tensor? I have only seen them used in the context of an undergraduate, upper level classical mechanics course, and within that context, I never understood the need to distinguish between matrices and tensors. They seemed like identical mathematical entities to me.
Just as an aside, my math background is roughly the one of a typical undergraduate physics major (minus the linear algebra).