MCQ · Mathematics · Coordinate Geometry
Q. Let O be the vertex of the parabola $x^2 = 4y$ and Q be any point on it. Let the locus of the point P, which divides the line segment OQ internally in the ratio $2 : 3$ be the conic C. Then the equation of the chord of $C$, which is bisected at the point $(1, 2)$, is :
A$5x – 4y + 3 = 0$ ✓
B$x – 2y + 3 = 0$
C$4x – 5y + 6 = 0$
D$5x – y – 3 = 0$
✅ Correct Answer: (A) $5x – 4y + 3 = 0$
Step-by-Step Solution
1
Identify vertex and parametric point on parabola
Vertex $O = (0, 0)$
Any point $Q$ on $x^2 = 4y$: $Q = (2t,\ t^2)$
Check: $(2t)^2 = 4t^2 = 4(t^2)$ ✓
Check: $(2t)^2 = 4t^2 = 4(t^2)$ ✓
2
Apply Section Formula (ratio 2 : 3, O to Q)
P divides OQ internally in ratio $2:3$:
$h = \dfrac{2(2t) + 3(0)}{2+3} = \dfrac{4t}{5}$
$k = \dfrac{2(t^2) + 3(0)}{2+3} = \dfrac{2t^2}{5}$
$k = \dfrac{2(t^2) + 3(0)}{2+3} = \dfrac{2t^2}{5}$
3
Eliminate parameter $t$ to get locus
From $h = \dfrac{4t}{5}$ → $t = \dfrac{5h}{4}$
$k = \dfrac{2}{5}\left(\dfrac{5h}{4}\right)^2 = \dfrac{2}{5} \cdot \dfrac{25h^2}{16} = \dfrac{5h^2}{8}$
$\Rightarrow 8k = 5h^2$
Replacing $h \to x$, $k \to y$:
$\Rightarrow 8k = 5h^2$
Conic $C$: $\boxed{5x^2 = 8y}$
4
Find chord of $C$ bisected at $(1, 2)$ using $T = S_1$
For conic $5x^2 – 8y = 0$, write as $S = 5x^2 – 8y$
Compute $S_1$ at $(1, 2)$:
Compute $S_1$ at $(1, 2)$:
$S_1 = 5(1)^2 – 8(2) = 5 – 16 = -11$
Write $T$ (chord equation with midpoint $(x_1, y_1) = (1,2)$):
$T = 5(x)(x_1) – 8\cdot\dfrac{y + y_1}{2}$
$= 5(x)(1) – 4(y + 2)$
$= 5x – 4y – 8$
Set $T = S_1$:
$= 5(x)(1) – 4(y + 2)$
$= 5x – 4y – 8$
$5x – 4y – 8 = -11$
$5x – 4y + 3 = 0$
$5x – 4y + 3 = 0$
5
Final Answer
$5x – 4y + 3 = 0$ → Option (A) ✓
Related Theory
📌 Standard Parabolas and Their Parametric Forms
The parabola $x^2 = 4ay$ has vertex at origin, opens upward, with focus at $(0,a)$.
$x^2 = 4ay$ → parametric: $(2at,\ at^2)$ $y^2 = 4ax$ → parametric: $(at^2,\ 2at)$
For $x^2 = 4y$, we have $a=1$, so $Q = (2t, t^2)$. Always verify: $(2t)^2 = 4t^2 = 4(t^2)$ ✓
$x^2 = 4ay$ → parametric: $(2at,\ at^2)$ $y^2 = 4ax$ → parametric: $(at^2,\ 2at)$
For $x^2 = 4y$, we have $a=1$, so $Q = (2t, t^2)$. Always verify: $(2t)^2 = 4t^2 = 4(t^2)$ ✓
📌 Section Formula (Internal Division)
If P divides segment joining $A(x_1,y_1)$ and $B(x_2,y_2)$ in ratio $m:n$ internally:
$h = \frac{2(2t)+3(0)}{5} = \frac{4t}{5}$, $k = \frac{2t^2}{5}$
$x = \dfrac{mx_2 + nx_1}{m+n}$
$y = \dfrac{my_2 + ny_1}{m+n}$
In this problem: $O=(0,0)$, $Q=(2t,t^2)$, ratio $= 2:3$:
$h = \frac{2(2t)+3(0)}{5} = \frac{4t}{5}$, $k = \frac{2t^2}{5}$
📌 Finding Locus by Eliminating Parameter
After getting $h = \frac{4t}{5}$ and $k = \frac{2t^2}{5}$:
Step 1: Express $t$ from the simpler equation: $t = \frac{5h}{4}$
Step 2: Substitute into the other: $k = \frac{2}{5}\cdot\frac{25h^2}{16} = \frac{5h^2}{8}$
Step 3: Write in standard form: $5h^2 = 8k$ → replace $h,k$ with $x,y$
This gives conic $C: 5x^2 = 8y$ — a parabola with axis along y-axis.
Step 1: Express $t$ from the simpler equation: $t = \frac{5h}{4}$
Step 2: Substitute into the other: $k = \frac{2}{5}\cdot\frac{25h^2}{16} = \frac{5h^2}{8}$
Step 3: Write in standard form: $5h^2 = 8k$ → replace $h,k$ with $x,y$
This gives conic $C: 5x^2 = 8y$ — a parabola with axis along y-axis.
📌 Chord with Given Midpoint — T = S₁ Method
This is the most important formula for chord-bisection problems in JEE:
For conic $S = 0$, the chord bisected at $(x_1, y_1)$ satisfies $T = S_1$ where:
• $T$ = equation obtained by replacing in $S$: $x^2 \to xx_1$, $y^2 \to yy_1$, $x \to \frac{x+x_1}{2}$, $y \to \frac{y+y_1}{2}$
• $S_1$ = value of $S$ at $(x_1, y_1)$
For $S = 5x^2 – 8y$:
$T = 5(x)(x_1) – 8\cdot\frac{y+y_1}{2} = 5x_1 x – 4(y+y_1)$
$S_1 = 5x_1^2 – 8y_1$
At $(1,2)$: $T = 5x – 4(y+2) = 5x-4y-8$ and $S_1 = 5-16=-11$
$T=S_1 \Rightarrow 5x-4y-8=-11 \Rightarrow 5x-4y+3=0$
For conic $S = 0$, the chord bisected at $(x_1, y_1)$ satisfies $T = S_1$ where:
• $T$ = equation obtained by replacing in $S$: $x^2 \to xx_1$, $y^2 \to yy_1$, $x \to \frac{x+x_1}{2}$, $y \to \frac{y+y_1}{2}$
• $S_1$ = value of $S$ at $(x_1, y_1)$
For $S = 5x^2 – 8y$:
$T = 5(x)(x_1) – 8\cdot\frac{y+y_1}{2} = 5x_1 x – 4(y+y_1)$
$S_1 = 5x_1^2 – 8y_1$
At $(1,2)$: $T = 5x – 4(y+2) = 5x-4y-8$ and $S_1 = 5-16=-11$
$T=S_1 \Rightarrow 5x-4y-8=-11 \Rightarrow 5x-4y+3=0$
📌 Why T = S₁ Works (Conceptual Basis)
Let the chord have endpoints $(x_1+h_1, y_1+k_1)$ and $(x_1-h_1, y_1-k_1)$ symmetric about midpoint $(x_1, y_1)$.
Both points lie on the conic. Subtracting their conic equations eliminates the constant and gives a linear relation — which is exactly $T = S_1$. This is a powerful algebraic shortcut that avoids solving for the actual endpoints.
Key insight: The locus equation (conic $C$) must be found first — $T=S_1$ is applied to conic $C$, not the original parabola!
Key insight: The locus equation (conic $C$) must be found first — $T=S_1$ is applied to conic $C$, not the original parabola!
📌 Common Mistakes to Avoid
❌ Mistake 1: Applying $T=S_1$ to the original parabola $x^2=4y$ instead of the locus conic $C: 5x^2=8y$.
❌ Mistake 2: Getting the section formula ratio reversed — remember O comes first (coordinates $(0,0)$), Q comes second.
❌ Mistake 3: Error in computing $T$ for $5x^2-8y=0$. The $y$ term has coefficient $-8$, so the midpoint substitution gives $-8\cdot\frac{y+y_1}{2} = -4(y+y_1)$.
❌ Mistake 4: Not simplifying correctly: $5x-4y-8=-11 \Rightarrow 5x-4y+3=0$ (add 11 to both sides).
❌ Mistake 2: Getting the section formula ratio reversed — remember O comes first (coordinates $(0,0)$), Q comes second.
❌ Mistake 3: Error in computing $T$ for $5x^2-8y=0$. The $y$ term has coefficient $-8$, so the midpoint substitution gives $-8\cdot\frac{y+y_1}{2} = -4(y+y_1)$.
❌ Mistake 4: Not simplifying correctly: $5x-4y-8=-11 \Rightarrow 5x-4y+3=0$ (add 11 to both sides).
📌 Shortcut Summary for This Type
Step 1: Parametrize $Q$ on original conic.
Step 2: Use section formula to get $(h,k)$ in terms of parameter.
Step 3: Eliminate parameter → locus equation = conic $C$.
Step 4: Apply $T=S_1$ on conic $C$ with given midpoint.
Step 5: Simplify to get chord equation.
Total time in exam: ~3 minutes
Step 2: Use section formula to get $(h,k)$ in terms of parameter.
Step 3: Eliminate parameter → locus equation = conic $C$.
Step 4: Apply $T=S_1$ on conic $C$ with given midpoint.
Step 5: Simplify to get chord equation.
Total time in exam: ~3 minutes
📌 JEE Exam Relevance
This problem combines two classic JEE topics:
• Locus problems (section formula + parametric elimination)
• Chord with given midpoint ($T=S_1$ method)
Both are guaranteed topics in JEE Main every year. The $T=S_1$ formula for parabola, ellipse, and hyperbola is a must-memorise result. Locus problems involving section formula appear at least once per session. Together, this question tests 2 high-value concepts in one problem.
• Locus problems (section formula + parametric elimination)
• Chord with given midpoint ($T=S_1$ method)
Both are guaranteed topics in JEE Main every year. The $T=S_1$ formula for parabola, ellipse, and hyperbola is a must-memorise result. Locus problems involving section formula appear at least once per session. Together, this question tests 2 high-value concepts in one problem.
📌 Key Formulas Reference Card
Parabola $x^2=4ay$: param $(2at, at^2)$
Section formula: $\left(\frac{mx_2+nx_1}{m+n},\frac{my_2+ny_1}{m+n}\right)$
Chord midpoint: $T = S_1$
For $5x^2-8y=0$: $T = 5xx_1 – 4(y+y_1)$
For $y^2=4ax$: chord midpoint $T = yy_1-2a(x+x_1)$
For $\frac{x^2}{a^2}+\frac{y^2}{b^2}=1$: $T=\frac{xx_1}{a^2}+\frac{yy_1}{b^2}-1$
Frequently Asked Questions
1. What is the vertex of $x^2 = 4y$?
The vertex is at the origin $O = (0, 0)$.
2. What is the parametric form of a point on $x^2 = 4y$?
$Q = (2t, t^2)$. Verify: $(2t)^2 = 4t^2 = 4(t^2)$ ✓
3. How is the section formula applied here?
P divides OQ (O first, Q second) in ratio 2:3: $h = \frac{2(2t)+3(0)}{5} = \frac{4t}{5}$, $k = \frac{2t^2}{5}$.
4. What is the equation of conic C?
$5x^2 = 8y$, obtained by eliminating $t$ from $h = 4t/5$ and $k = 2t^2/5$.
5. What is $S_1$ for conic $5x^2 – 8y = 0$ at $(1,2)$?
$S_1 = 5(1)^2 – 8(2) = 5 – 16 = -11$.
6. What is $T$ for conic $5x^2 – 8y = 0$ with midpoint $(1,2)$?
$T = 5(x)(1) – 4(y + 2) = 5x – 4y – 8$.
7. How does $T = S_1$ give the chord?
$5x – 4y – 8 = -11 \Rightarrow 5x – 4y + 3 = 0$.
8. Is conic C a parabola or ellipse?
$5x^2 = 8y$ is a parabola (only $x^2$ term, $y$ is linear).
9. What is the most common error in this problem?
Applying $T=S_1$ to the original parabola $x^2=4y$ instead of the locus conic $C: 5x^2=8y$.
10. What is the final answer?
$5x – 4y + 3 = 0$, Option (A).
11. When is $T = S_1$ used vs. $T = 0$?
$T = S_1$ → chord with given midpoint. $T = 0$ → chord of contact from external point. These are different — don’t confuse them.
Related JEE Main Questions
If the coefficient of $x$ in the expansion of $(ax^2 + bx + c)(1 – 2x)^{26}$ is $-56$ and the coefficients of $x^2$ and $x^3$ are both zero, then $a + b + c$ is equal to :
(A) 1483
(B) 1300
(C) 1500
(D) 1403
✅ Correct Answer: (D) 1403
Let $a_1, a_2, a_3, \dots$ be a G.P. of increasing positive terms such that $a_2 \cdot a_3 \cdot a_4 = 64$ and $a_1 + a_3 + a_5 = \dfrac{819}{7}$. Then $a_3 + a_5 + a_7$ is equal to :
(A) 3256
(B) 3252
(C) 3248
(D) 3244
✅ Correct Answer: (B) 3252
Locus of the point of intersection of two tangents drawn to the circle $x^2 + y^2 – 4x – 6y – 3 = 0$ such that the angle between the tangents is $\dfrac{\pi}{3}$.
(A) A Circle
(B) A Parabola
(C) $3(x^2+y^2)-12x-18y-25=0$
(D) An Ellipse
✅ Correct Answer: (C)
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(A) $[0,1]$
(B) $[0,1.5]$
(C) $[1,2]$
(D) $\mathbb{R}$
✅ Correct Answer: (B) $[0,1.5]$
The sum of an infinite G.P. is 5 and the sum of squares of its terms is 15. The common ratio is:
(A) $\dfrac{3}{2}$
(B) $\dfrac{1}{4}$
(C) $\dfrac{2}{3}$
(D) $\dfrac{1}{2}$
✅ Correct Answer: (C) $\dfrac{2}{3}$