(b) On a single Argand diagram, sketch the three roots.

The complex number (z) satisfies the equation [ z^3 = -8\sqrt2 + 8\sqrt2 i. ]

Thus exact area = (\frac3\sqrt34 \cdot 4\sqrt[3]4 = 3\sqrt3 \cdot \sqrt[3]4). If you meant something else (e.g., a different question from MJC 2010 Prelim), just let me know the , and I’ll produce the exact problem and solution.

I notice you’ve asked for "Mjc 2010 H2 Math Prelim" — but it seems you want me to , likely meaning a problem or solution from that paper .

For now, here’s a in the style of MJC 2010 H2 Math Prelim Paper 1: Question (Complex Numbers)

Better: (16^1/3 = 2^4/3). But leave as (\sqrt[3]16 = 2\sqrt[3]2).

Mjc 2010 H2 Math Prelim Now

(b) On a single Argand diagram, sketch the three roots.

The complex number (z) satisfies the equation [ z^3 = -8\sqrt2 + 8\sqrt2 i. ] Mjc 2010 H2 Math Prelim

Thus exact area = (\frac3\sqrt34 \cdot 4\sqrt[3]4 = 3\sqrt3 \cdot \sqrt[3]4). If you meant something else (e.g., a different question from MJC 2010 Prelim), just let me know the , and I’ll produce the exact problem and solution. (b) On a single Argand diagram, sketch the three roots

I notice you’ve asked for "Mjc 2010 H2 Math Prelim" — but it seems you want me to , likely meaning a problem or solution from that paper . (b) On a single Argand diagram

For now, here’s a in the style of MJC 2010 H2 Math Prelim Paper 1: Question (Complex Numbers)

Better: (16^1/3 = 2^4/3). But leave as (\sqrt[3]16 = 2\sqrt[3]2).