If a point in argand plane A 3-2 rotated through B 1-1 about -4 to obtain C- then area of ABC is 5A- - sq- unitB- A- sq- unitC- -50-2 sq- unitD- -50-4 sq- unit

Let z_A=3+2i,z_B=1+i and after rotating z_A the complex number be z_C then nbsp; |z_A z_B|=|z_C z_B| Using rotation property we have z_C z_Bz_A z_B=|z_C z_B|| ...

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Standard XII

Mathematics

Rotation Concept

If a point in...

Question

If a point in argand plane $A (3, 2)$ rotated through $B (1, 1)$ about $\frac{π}{4}$ to obtain $C$ , then area of $△ A B C$ is

\frac{5}{4}

sq. unit

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\frac{5}{2}

sq. unit

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\frac{\sqrt{50}}{2}

sq. unit

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\frac{\sqrt{50}}{4}

sq. unit

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Solution

The correct option is D $\frac{\sqrt{50}}{4}$ sq. unit
Let $z_{A} = 3 + 2 i, z_{B} = 1 + i$ and after rotating $z_{A}$ the complex number be $z_{C}$ then
$| z_{A} - z_{B} | = | z_{C} - z_{B} |$
Using rotation property we have
$\frac{z_{C} - z_{B}}{z_{A} - z_{B}} = \frac{| z_{C} - z_{B} |}{| z_{A} - z_{B} |} e^{i π / 4} \Rightarrow \frac{z_{C} - z_{B}}{2 + i} = \frac{1}{\sqrt{2}} + \frac{i}{\sqrt{2}} \Rightarrow z_{C} = (1 + i) + (\frac{1}{\sqrt{2}} + \frac{3 i}{\sqrt{2}}) ∴ z_{C} = \frac{1 + \sqrt{2}}{\sqrt{2}} + \frac{(3 + \sqrt{2}) i}{\sqrt{2}}$
Now $A C = | z_{A} - z_{C} | = \frac{1}{\sqrt{2}} \sqrt{(2 \sqrt{2} - 1)^{2} + (\sqrt{2} - 3)^{2}}$
$= \sqrt{10 - 5 \sqrt{2}}$ unit

Now $B D = ∣ ∣ ∣ z_{B} - (\frac{z_{A} + z_{C}}{2}) ∣ ∣ ∣ [∵ A B = C B]$
$B D = \frac{\sqrt{10 + 5 \sqrt{2}}}{2}$ unit
Hence required area $= \frac{A C \times B D}{2}$
$= \frac{\sqrt{50}}{4}$ sq. unit
(Here we have considers anticlockwise direction however clock wise direction will also give same answer)

Alternte Solution:
Using $sine$ rule
required area will be $= \frac{1}{2} (A B) (B C) sin (π / 4)$
$= \frac{1}{2 \sqrt{2}} (A B)^{2} = \frac{1}{2 \sqrt{2}} [2^{2} + 1^{2}]$
$= \frac{\sqrt{50}}{4}$ sq. unit

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Rotation Concept

Standard XII Mathematics

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If a point in argand plane A(3,2) rotated through B(1,1) about π4 to obtain C, then area of △ABC is

If a point in argand plane $A (3, 2)$ rotated through $B (1, 1)$ about $\frac{π}{4}$ to obtain $C$ , then area of $△ A B C$ is