The line y = x + 1 is a tangent to the curve y² = 4x at the point

(A) (1, 2) (B) (2, 1) (C) (1, −2) (D) (−1, 2)

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Solution

The equation of the given curve is.

Differentiating with respect to x, we have:

Therefore, the slope of the tangent to the given curve at any point (x, y) is given by,

The given line is y = x + 1 (which is of the form y = mx + c)

∴ Slope of the line = 1

The line y = x + 1 is a tangent to the given curve if the slope of the line is equal to the slope of the tangent. Also, the line must intersect the curve.

Thus, we must have:

Hence, the line y = x + 1 is a tangent to the given curve at the point (1, 2).

The correct answer is A.

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Similar questions

Chose the correct answer.

The line y=x+1 is a tangent to the curve $y^{2} = 4 x$ at the point

(a) (1,2) (b) (2,1) (c) (1,-2) (d) (-1,2).

y = x + 1

y^{2} = 4 x

y = e^{x}

(c, e^{c})

y^{2} = 4 x

(1, 2)

x

c

y^{2} = 4 x,

y = 2 x + 4

y^{2} = 2 x^{3}

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