If roots of the equation $a x^{3} + b x^{2} + c x + d = 0$ remain unchanged by increasing each coefficient by one unit, then

a = b = c = d $\neq$ 0

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a = b $\neq$ c = d $\neq$ 0

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$a \neq b \neq c \neq d \neq 0$

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$a \neq 0, b + c = 0, d \neq 0$

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Solution

The correct option is A
a = b = c = d $\neq$ 0

$T h e r o o t s o f a x^{3} + b x^{2} + c x + d = 0 a n d (a + 1) x^{3} + (b + 1) x^{3} + (c + 1) x + (d + 1) = 0$ are same.
$∴ \frac{a + 1}{a} = \frac{b + 1}{b} = \frac{c + 1}{c} = \frac{d + 1}{d} \Rightarrow a = b = c = d \neq 0$

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Similar questions

If roots of the equation $a x^{3} + b x^{2} + c x + d = 0$ remain unchanged by increasing each coefficient by one unit, then

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Evaluate: ${lim}_{x \to 0} \frac{a x + b}{c x + d}, d \neq 0$

Three distinct points $P (3 u^{2}, 2 u^{3}); Q (3 v^{2}, 2 v^{3}) a n d R (3 w^{2}, 2 w^{3})$ are collinear and equation $a x^{3} + b x^{2} + c x + d = 0$ has roots u, v and w, then which of the following is true

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If roots of the equation ax3+bx2+cx+d=0 remain unchanged by increasing each coefficient by one unit, then

The correct option is A a = b = c = d ≠ 0 The roots of ax3+bx2+cx+d=0 and (a+1)x3+(b+1)x3+(c+1)x+(d+1)=0 are same. ∴ a+1a=b+1b=c+1c=d+1d ⇒ a=b=c=d≠0

If roots of the equation $a x^{3} + b x^{2} + c x + d = 0$ remain unchanged by increasing each coefficient by one unit, then

The correct option is A
a = b = c = d $\neq$ 0

$T h e r o o t s o f a x^{3} + b x^{2} + c x + d = 0 a n d (a + 1) x^{3} + (b + 1) x^{3} + (c + 1) x + (d + 1) = 0$ are same.
$∴ \frac{a + 1}{a} = \frac{b + 1}{b} = \frac{c + 1}{c} = \frac{d + 1}{d} \Rightarrow a = b = c = d \neq 0$