NVAMediumJEE 2023Straight Line Equations

JEE Mathematics 2023 Question with Solution

A triangle is formed by the XX-axis, YY-axis, and the line 3x+4y=603x + 4y = 60. Then the number of points P(a,b)P(a, b), where aa is an integer and bb is a multiple of aa, which lie strictly inside the triangle, is:_____

Answer

Correct answer:31

Step-by-step solution

Standard Method

Given: A triangle is formed by the coordinate axes and the line 3x+4y=603x + 4y = 60.

Find: The number of points P(a,b)P(a,b) lying strictly inside the triangle such that aa is an integer and bb is a multiple of aa.

The intercepts of the line are (20,0)(20,0) and (0,15)(0,15) so the interior points satisfy x>0,y>0x>0, y>0 and $$ 3x+4y<60

Since $$b$$ is a multiple of $$a$$, let $$b=ka$$ where $$k$$ is a positive integer.

Now count valid points for each integer value of x=ax=a using the bounds shown in the solution:

If x=1x=1, then $$ y<\frac{60-3}{4}=\frac{57}{4}=14.25

So the points are $$(1,1),(1,2),\dots,(1,14)$$ giving **$$14$$** points.

If x=2x=2, then $$ y<\frac{60-6}{4}=\frac{27}{2}=13.5

Multiples of $$2$$ below this are $$(2,2),(2,4),\dots,(2,12)$$ giving **$$6$$** points.

If x=3x=3, then $$ y<\frac{60-9}{4}=\frac{51}{4}=12.75

The points are $$(3,3),(3,6),(3,9),(3,12)$$ giving **$$4$$** points.

If x=4x=4, then $$ y<\frac{60-12}{4}=12

Strictly inside means $$y<12$$, so the points are $$(4,4),(4,8)$$ giving **$$2$$** points.

If x=5x=5, then $$ y<\frac{60-15}{4}=\frac{45}{4}=11.25

The points are $$(5,5),(5,10)$$ giving **$$2$$** points.

If x=6x=6, then $$ y<\frac{60-18}{4}=\frac{21}{2}=10.5

The point is $$(6,6)$$ giving **$$1$$** point.

If x=7x=7, then $$ y<\frac{60-21}{4}=\frac{39}{4}=9.75

The point is $$(7,7)$$ giving **$$1$$** point.

If x=8x=8, then $$ y<\frac{60-24}{4}=9

Strictly inside gives only $$(8,8)$$, so there is **$$1$$** point.

If x=9x=9, then $$ y<\frac{60-27}{4}=\frac{33}{4}=8.25

No positive multiple of $$9$$ is less than $$8.25$$, so there is no point.

Hence total number of points is

14+6+4+2+2+1+1+1=3114+6+4+2+2+1+1+1=31

Therefore, the required number of points is 3131.

Coordinate axes with the line joining intercepts (0,15) and (20,0), showing the triangular region in the first quadrant and markings used for counting integer points.

Counting by multiples of the x-coordinate

Given: 3x+4y=603x+4y=60 bounds the triangle in the first quadrant.

Find: Count all points P(a,b)P(a,b) with integer aa and with bb a multiple of aa, lying strictly inside the triangle.

For a fixed integer a=xa=x, the largest allowed value of yy is obtained from

y<603x4y<\frac{60-3x}{4}

Now bb must be one of x,2x,3x,x,2x,3x,\dots below that upper bound.

Thus for each integer xx, the number of choices equals the number of positive multiples of xx that are strictly less than 603x4\frac{60-3x}{4}. Evaluating for x=1x=1 to 99 gives counts:

  • x=114x=1 \Rightarrow 14
  • x=26x=2 \Rightarrow 6
  • x=34x=3 \Rightarrow 4
  • x=42x=4 \Rightarrow 2
  • x=52x=5 \Rightarrow 2
  • x=61x=6 \Rightarrow 1
  • x=71x=7 \Rightarrow 1
  • x=81x=8 \Rightarrow 1
  • x=90x=9 \Rightarrow 0

Adding these,

3131

So the correct answer is 3131.

Common mistakes

  • Including points on the line 3x+4y=603x+4y=60 as interior points is incorrect because the question asks for points strictly inside the triangle. Use the inequality 3x+4y<603x+4y<60, not 3x+4y603x+4y\le 60.

  • Treating “bb is a multiple of aa” as meaning only b=ab=a is wrong. It means b=kab=ka for some integer kk, so values like 2a,3a,4a2a,3a,4a must also be checked.

  • Checking all integer lattice points inside the triangle without applying the divisibility condition overcounts the answer. After fixing aa, count only those yy values that are positive multiples of aa.

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