Statement 1 gives us the time and the speed so we can derive the distance:

.

Therefore,

Statement 2 tells us that the gas station is halfway betweent the two houses so:

distance between Barry's house and gas station = distance between Harry's house and gas station = 0.5 distance between the two houses

Furthermore, we learn that the distance between the gas station and Harry's house is 20 miles.

Therefore:

distance between Harry's house and gas station = 20 miles = 0.5 distance between the two houses

So the distance = 2 x 20 = 40 miles

So the correct answer is D; each statement alone is sufficient.

We are given a point and two clues.

Both I and II give us the slope of f(x). It must be 4 because we are told so in II. This holds true from statement I since it must be parallel to g(x), which has a slope of four.

With a slope and a point we can find the equation of f(x) using the point slope form,

.

Therefore either statement alone is enough.

To find b, we need a point on k(t).

I) Gives us that point.

II) Gives us some details about a parallel line, which is cool and all, but it doesn't help us find b.

So statement I alone is sufficient to answer the question.

To find m, we need a point on the line.

Both I and II give us points, so we can use either of them to solve for m.

To answer the question we must know the absolute value of.

Statement 1 tells us the absolute value of, indeed, it is.

Statement 2 also tells us that the absolute value ofis 5, since.

Therefore, the final answer is each statement alone is sufficient.

To be able to answer the question, we must have a definitive value for.

Statement 1 tells us thatis, in other wordscould be two valuesor. This statement gives us two possibilities forand is therefore insufficient.

Statement 2 tells us that the cube ofis, thereforemust be. This statement gives a single possible value forand therefore is, alone, sufficient.

To answer the question, we should be able to find a single value for.

Statement 1 gives us two possible values for. Indeed,or. Hence, the information provided doesn't allow us to find the answer to the problem.

Statement 2 although a complicated equation to calculate, won't prove useful because the power is an even number and therefore, the equation will also have two solutions.

Both statements together are not sufficient because they both give us the value of, which is not sufficient.

Hence, statements 1 and 2 taken together are not sufficient.

To begin with, we should see that information about unknownsorwould be useful to answer the problem. We already know that both these unknowns are integers.

声明1给我们信息上bound for. However,can still be an infinity of values, therefore this statement alone is insufficient.

Statement 2 gives us information about the lower bound for, just as statement 1, this statement alone doesn't allow us to find a single value for.

Taking these statements together we get that. Sinceis an integer,can only be. Both statements together are sufficient.

Firstly, we should try to simplify the equation, to see solutions for. We get. The best west way to simplify quadratic equations is to find the possible factors for the last termin the general quadratic equationand those two factors must add up to. Here for example,andadd up toand their products is.

So we have to solutions for the equation and we need to know whatwe are looking for.

Statement 1 tells us thatis positive, however, the two possible solutions are positive and therefore, statement 1 doesn't help us find the correct solution for.

Statement 2 tells us thatis smaller than 3. Only one of our solutions is smaller than 3. Therefore statement 2 alone is sufficient.

First, we should try to simplify the quadratic equation, and we get. This allows to see the two solutions for our equation.

Statement 1 tells us thatis betweenand. But both possible solutions are in this interval. Therefore statement 1 alone is not sufficient.

Statement 2 tells us thatis an integer, which we already knew by reducing the equation. Therefore, this statements doesn't help us find a single value for

Statements 1 and 2 together are still insufficient, since none can help us find a single value for.