Tangents and Normals is an important topic in the Mathematics section in TS EAMCET exam. Practising this topic will increase your score overall and make your conceptual grip on TS EAMCET exam stronger.
This article gives you a full set of TS EAMCET PYQs for Tangents and Normals with explanations for effective preparation. Practice of TS EAMCET Mathematics PYQs including Tangents and Normals questions regularly will improve accuracy, speed, and confidence in the TS EAMCET 2026 exam.
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TS EAMCET PYQs for Tangents and Normals with Solutions
1.
The equation of the normal drawn to the curve \( y^3 = 4x^5 \) at the point \( (4,16) \) is:- \( 20x + 3y = 128 \)
- \( 20x - 3y = 32 \)
- \( 3x - 20y + 308 = 0 \)
- \( 3x + 20y = 332 \) \bigskip
2.
If f(x) = ex, h(x) = (fof) (x), then \(\frac{h'(x)}{h'(x)}\) =
h(x)
\(\frac{1}{h(x)}\)
\(log h(x)\)
\(-log h(x)\)
3.
A point \( P \) is moving on the curve \( x^3 y^4 = 27 \). The x-coordinate of \( P \) is decreasing at the rate of 8 units per second. When the point \( P \) is at \( (2, 2) \), the y-coordinate of \( P \) is:- increases at the rate of 6 units per second
- decreases at the rate of 6 units per second
- increases at the rate of 4 units per second
- decreases at the rate of 4 units per second \bigskip
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