Question: A parabola in the coordinate geometry plane is represented by the equation y = x^2 + k, where k is a constant greater than 0. Line L intersects this parabola at exactly one point. Is this point of intersection in Quadrant I?

(1) The slope of line L is positive.
(2) x is greater than 0.

A) Statement (1) ALONE is sufficient, but statement (2) ALONE is not sufficient.
B) Statement (2) ALONE is sufficient, but statement (1) ALONE is not sufficient.
C) BOTH statements TOGETHER are sufficient, but NEITHER statement ALONE is sufficient.
D) EACH statement ALONE is sufficient.
E) Statements (1) and (2) TOGETHER are not sufficient.

Correct Answer: D
Solution and Explanation:
Approach Solution 1:

You are informed that the parabola's equation is
Where k is POSITIVE (let's suppose k = 2), y = x2 + k. If so, y = x2 + 2.

Since x2's coefficient is positive, the parabola will be upward-looking.
Since x2 cannot be negative, x2 + 2 has no real roots because it can never equal 0. Consequently, it won't cut the x-axis anywhere.

The parabola cuts the y-axis at 0 when x = 0 and y = 2. (0, 2).
The parabola will be symmetric about the y-axis because there is no bx term (for both x = 3 and -3, y will be 11 etc.).
The parabola will therefore be symmetric about the y axis, above the x axis, and intersect the y axis at point k. (which we assumed 2 for ease).
Therefore, case 2 of your illustration is illogical. A parabola MUST appear as in example 1.

D is the correct answer.

Approach Solution 2:

You can see that this parabola opens upward, is centered on the y-axis, and has its lowest point (vertex) above the x-axis (since k is positive) if you have a rudimentary understanding of curved lines in the coordinate geometry plane. Make sure to take the time to quickly sketch down this parabola before you begin to analyze each statement because it is crucial to this problem that you have a proper visual representation of it.

Assuming line L precisely meets this parabola at one point, if you've drawn the parabola correctly, you can visually observe various possibilities along the parabola. The parabola does not even touch the other two quadrants, making the only junction points in Quadrants I and II obvious. Whether or not that junction point is in quadrant I is the subject of the inquiry.

You can infer from Statement 1 that Line L has a positive slope. You can show that no matter the line, it must intersect the parabola in the first quadrant if you draw a few lines with positive slopes that only cross the curve once. The y axis would be the point of intersection if the slope were 0 (which is not permitted), and as the slope increases from 0 to infinity, it can only intersect in the first quadrant. The first statement is adequate. Take away (B), (C), and (E).

You can only find intersection sites in the first quadrant if x is positive, as all x values in the second quadrant are negative, according to statement 2. Statement 2 is likewise adequate, and the correct response is (D).

D is the correct answer.

Approach Solution 3:

First, here is a picture of the y = x2 graph:

All of the y-coordinates on the graph of y = x2 will increase by k units as we are adding k, which is positive.
Consequently, the graph of y = x2 + k will resemble this:

The point of intersection (of the line and parabola) must be in either quadrant I or II since the graph of y = x2 + k only lies in quadrants I and II.

Statement 1: Line L has a positive slope
This is all that has to be said. This is why:
A line with a positive slope will also cross the parabola at a location in quadrant I if it meets the parabola in quadrant II.
For instance:

We may be positive that line L cannot intersect the parabola in quadrant II because we are informed that line L intersects this parabola at exactly one spot.
Line L must therefore only cross the parabola in quadrant I.
Statement 1 is sufficient because we are confident in our ability to respond to the target question.

Here's another angle to consider if you're still not persuaded.
Line L must be tangent to the parabola if it crosses it precisely once along its length.
Line L, for instance, would look like this:

Or as follows:

As you can see, the point of intersection for line L must be in quadrant I if it has a positive slope and is tangent to the parabola.

Second claim: x is greater than 0.
I don't particularly like this phrasing.
I would phrase sentence 2 as follows for clarity: The junction point's x-coordinate is positive.
This indicates that line L must be perpendicular to the parabola at one of the below-shown red dots.

We may be positive that line L must cross the parabola in quadrant I because all of the intersection points are in quadrant I.
Statement 2 is sufficient since we are confident in our ability to respond to the target question.

Response: D

“A Parabola in the Coordinate Geometry Plane is Represented GMAT Data sufficiency” – is a topic of the GMAT Quantitative reasoning section of GMAT. This question has been taken from the book "GMAT Quantitative Review". GMAT Quant section consists of a total of 31 questions. GMAT Data Sufficiency questions consist of a problem statement followed by two factual statements. GMAT data sufficiency comprises 15 questions which are two-fifths of the total 31 GMAT quant questions.

Suggested GMAT Data Sufficiency Samples

• If The Sum of The 4th Term and The 12th Term of an Arithmetic Progress GMAT Data Suffiency
• The symbol ∆ Denotes One of The Four Arithmetic Operations: Addition, Subtraction, Multiplication, or Division GMAT Data Suffiency
• Find the Greatest Number That Will Divide 43,91 and 183 So as to Leave GMAT Data Suffiency
• Six Bells Commence Tolling Together and Toll at Intervals of 2, 4, 6, 8 10 and 12 seconds Respectively GMAT Data Suffiency
• Excluding Stoppages, The Speed of a Bus is 54 km/hr and Including Stoppage, It is 45 km/hr GMAT Data Suffiency
• Find The Value Of x< GMAT Data Suffiency/b>
• If y = x^2 - 6x + 9, what is the value of x? GMAT Data Suffiency
• Is xy<1? GMAT Data Suffiency
• S is a set of n consecutive positive integers. Is the mean of the set a positive integer? GMAT Data Suffiency
• If y=2(x+1)y=2(x+1), What is the Value of y – x? GMAT Data Suffiency
• From a group of M employees, N will be selected, at random, to sit in a line of N chairs GMAT Data Suffiency
• The Selling Price of an Article is Equal to the Cost of the Article GMAT Data Suffiency
• Does the equation y = (x – p)(x – q) intercept the x-axis at the point (2,0)? GMAT Data Suffiency
• What is the value of x if x^3 < x^2? GMAT Data Suffiency
• If Point O is The Centre of The Circle in The Figure Above, What is The Radius of The Circle? GMAT Data Suffiency
• A merchant has 1000 kg of sugar part of which he sells at 8% profit and the rest at 18% profit GMAT Data Suffiency
• If 30 is divided by half and 10 is added to the result, then what is the final result? GMAT Data Suffiency
• Company C sells a line of 25 products with an average retail price of $1,200 GMAT Data Suffiency
• The-set-s-of-numbers-has-the-following-properties GMAT Data Suffiency
• If a = 1 and (a - b)/c = 1 which of the following is NOT a possible value of b? GMAT Data Suffiency
• Walking at 6/7 th of his usual speed, a man is 25 min too late GMAT Data Suffiency
• An Inlet Pipe can Fill in an Empty Cistern in 30 minutes Whereas a leak in the Bottom of the Cistern can Empty a Filled Tank in 40 minutes
• A milkman cheats his customers by adding water to the milk he sells GMAT Data Suffiency
• if 80 lamps can be lighted, 5 hours per day for 10 days for $21.25, then the number of lamps GMAT Data Suffiency
• Few of the corporate contributions to the earthquake relief fund, aside from Pterocom GMAT Data Suffiency
• The product of the first 10 prime numbers is closest to which of the following? GMAT Data Suffiency
• There is a 120 liter mixture of alcohol and water. The ratio of alcohol to water is 7 : 5 GMAT Data Suffiency
• An equilateral triangle ABC is inscribed in square ADEF, forming three right triangles GMAT Data Suffiency
• A Furniture Store Sells Only Two Models of Desks, Model A and Model B. The Selling Price of Model A is $120 GMAT Data Suffiency
• A contractor combined x tons of a gravel mixture that contained 10 percent gravel G GMAT Data Suffiency
• There are 100 Apples in a Bag of which 98% are Green and Rest are Red GMAT Data Suffiency
• How many litres of a 90% solution of concentrated acid needs to be mixed with a 75% solution GMAT Data Suffiency
• Jug Contains Water And Orange Juice In The Ratio 5:7 . Another Jug Contains Water And Orange J GMAT Data Suffiency
• The number of ways in which 8 different flowers can be seated to form a garland so that 4 particular flowers are never separated
• A train travels from Albany to Syracuse, a distance of 120 miles, at an average rate of 50 miles per hour GMAT Data Suffiency
• The hexagon ABCDEF is regular. That means all its sides are the same length and all its interior angles are the same size GMAT Data Suffiency
• y varies directly as x and when x = 6, y = 24. What is the value of y, when x = 5? GMAT Data Suffiency
• If k is an Integer and 2 < k < 7, for How Many Different Values of k is There a Triangle With Sides of Lengths 2, 7, and k?
• How many factors does 36^2 have? GMAT Data Suffiency
• A number when divided successively by 4 and 5 leaves remainder 1 and 4 respectively GMAT Data Suffiency
• A Pentagon With 5 Sides Of Equal Length And 5 Interior Angles Of Equal measure is Inscribed in a Circle GMAT Data Suffiency
• The Average Age of Chief Executive Officers (CEO’s) in a Large Sample of Companies is 57 GMAT Data Suffiency
• p, r, s, t, u An Arithmetic Sequence is a Sequence in Which each Term After the First Term is Equal to the Sum of the Preceding Term and a Constant GMAT Data Suffiency
• If The Average (arithmetic mean) of The Four numbers 3, 15, 32, and (N + 1) is 18, then N = GMAT Data Suffiency
• A Right Angled Triangle has its Sides in Arithmetic Progression and Being Integers GMAT Data Suffiency
• Out of 7 Consonants and 4 Vowels, How Many Words of 3 Consonants and 2 Vowels Can be Formed? GMAT Data Suffiency
• 4 Bells Toll Together at 9:00 A.M. They Toll After 7, 8, 11 and 12 seconds Respectively GMAT Data Suffiency
• If 0 < a < b < c, which of the following statements must be true? GMAT Data Suffiency
• 12 Marbles are Selected at Random from a Large Collection of White, Red, Green and Yellow Marbles GMAT Data Suffiency
• What is the Remainder When 3^35 is Divided by 5? GMAT Data Suffiency