A tank is being filled with a liquid. L(t), given below, is the amount of liquid in liters in the tank after t minutes.

L(t)=1.25t+73

Let L⁻¹ be the inverse function of L.

Take x to be an output of the function L.

That is, x=L(t) and t=L⁻¹(x).

Which statement best describes L⁻¹(x)?

A tank is being filled with a liquid. L(t), given below, is the amount of liquid in liters in the tank after t minutes.

L(t)=1.25t+73

Let L⁻¹ be the inverse function of L.

Take x to be an output of the function L.

That is, x=L(t) and t=L⁻¹(x).

Find L^-1(x).

, A tank is being filled with a liquid. L(t), given below, is the amount of liquid in liters in the tank after t minutes.

L(t)=1.25t+73

Let L⁻¹ be the inverse function of L.

Take x to be an output of the function L.

That is, x=L(t) and t=L⁻¹(x).

Find L^-1(125). If necessary, round your answer to the nearest tenth.

P(n), given below, is the price in dollars for n grams of vitamins.

P(n)=0.2n+5.3

Let P⁻¹ be the inverse function of P.

Take x to be an output of the function P.

That is, x=P(n) and n=P⁻¹(x).

Which statement best describes P⁻¹(x)?

P(n), given below, is the price in dollars for n grams of vitamins.

P(n)=0.2n+5.3

Let P⁻¹ be the inverse function of P.

Take x to be an output of the function P.

That is, x=P(n) and n=P⁻¹(x).

Find P^-1(x).

P(n), given below, is the price in dollars for n grams of vitamins.

P(n)=0.2n+5.3

Let P⁻¹ be the inverse function of P.

Take x to be an output of the function P.

That is, x=P(n) and n=P⁻¹(x).

Find P^-1(6.6). If necessary, round your answer to the nearest tenth.

Scientists have found a relationship between the temperature and the height above a distant planet's surface. T(h), given below, is the temperature in Celsius at a height of h kilometers above the planet's surface. The relationship is as follows.

T(h)=45-1.25h

Let T⁻¹ be the inverse function of T.

Take x to be an output of the function T.

That is, x=T(h) and h=T⁻¹(x).

Which statement best describes T⁻¹(x)?

Scientists have found a relationship between the temperature and the height above a distant planet's surface. T(h), given below, is the temperature in Celsius at a height of h kilometers above the planet's surface. The relationship is as follows.

T(h)=45-1.25h

Let T⁻¹ be the inverse function of T.

Take x to be an output of the function T.

That is, x=T(h) and h=T⁻¹(x).

Find T⁻¹(x).

Scientists have found a relationship between the temperature and the height above a distant planet's surface. T(h), given below, is the temperature in Celsius at a height of h kilometers above the planet's surface. The relationship is as follows.

T(h)=45-1.25h

Let T⁻¹ be the inverse function of T.

Take x to be an output of the function T.

That is, x=T(h) and h=T⁻¹(x).

Find T⁻¹(29). If necessary, round to the nearest tenth.