The least positive integer x satisfying 2^{20 | vedclass

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(A) We know that $2^2 = 4 \equiv -1 \pmod{5}$.Now,$2^{2010} = (2^2)^{1005} \equiv (-1)^{1005} \pmod{5}$.Since $1005$ is an odd number,$(-1)^{1005} = -

Vedclass · Accepted Answer

$3$

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(A) We know that $2^2 = 4 \equiv -1 \pmod{5}$.Now,$2^{2010} = (2^2)^{1005} \equiv (-1)^{1005} \pmod{5}$.Since $1005$ is an odd number,$(-1)^{1005} = -1$.So,$2^{2010} \equiv -1 \equiv 4 \pmod{5}$.Given the congruence $2^{2010} \equiv 3x \pmod{5}$,we substitute $2^{2010} \equiv 4 \pmod{5}$:$4 \equiv 3x \pmod{5}$.To solve for $x$,multiply both sides by the modular inverse of $3$ modulo $5$,which is $2$ (since $3 	imes 2 = 6 \equiv 1 \pmod{5}$):$2 	imes 4 \equiv 2 	imes 3x \pmod{5}$$8 \equiv 6x \pmod{5}$$3 \equiv x \pmod{5}$.Thus,the least positive integer $x$ is $3$.

The least positive integer $x$ satisfying $2^{2010} \equiv 3x \pmod{5}$ is

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