How do you solve sqrt(4y+21)=y4y+21=y?

2 Answers
R V SUBBARAO
Oct 15, 2015

yy = 77

Explanation:

sqrt(4y+21)4y+21 = yy

squaring on both sides

(sqrt(4y+21))^2(4y+21)2 =y^2y2
4y +21 = y^24y+21=y2

rearranging the equation

y^2-4y -21 = 0y24y21=0

y^2-7y+3y -21 = 0y27y+3y21=0
y(y-7)+3(y-7) = 0y(y7)+3(y7)=0
(y-7)(y+3) = 0(y7)(y+3)=0
y-7 =0 or y+3 = 0y7=0ory+3=0
y=7 and y= -3 y=7andy=3

Then we have to check if both these values of yy will satisfy the original equation or not

1: When y=7y=7,

sqrt(4xx7+21)4×7+21 = 77
or,sqrt(28+21)or,28+21 = 77
or,sqrt(49)or,49 = 77
or,7=7or,7=7

which is true, therefore y=7

2:When y=-3,
Case-1
sqrt(4xx(-3)+21) = -3
or,sqrt(-12+21) = -3
or,sqrt(9) = -3
or,3!=-3

therefore y!=-3

Therefore, the value of y is 7
Case-2
sqrt(4xx(-3)+21) = -3
or,sqrt(-12+21) = -3
or,sqrt(9) = -3
or, sqrt (-3^2)=-3#
-3 = -3

Hence 7 and -3 are roots for this equation

R V SUBBARAO
Oct 17, 2015

y = 7 and -3

Explanation:

sqrt(4y+21) = y

When y = -3

sqrt(4X(-3)+21) = -3
sqrt(-12+21)=-3
sqrt(9)=-3

case -1

sqrt(-3^2)= -3

-3 = -3

=0
Hence -3 also satisfied the equation, hence -3 is also root for the above equation along with 7

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