Simplifying radicals numbers
Adding Radicals
Multiplying radicals
Combination (adding and multiplying radicals)
Radom
100
Simplify √45
3√5
100
Simplify √2+3√2
4√2
100
Simplify √(6 ) * √(6 )
6
100
Simplify 2 √5 * (√6 + 2)
2 √30 + 4 √5
100

352

1225

200
Simplify √75
5√3
200
Simplify √125+√5
6√5
200
Simplify -4 √15 * - √3
12√3
200
Simplify √3v * (√6 + √10)
3√2v + √30v
200

This Greek mathematician is associated with a famous right triangle theorem.

Pythagoras

300
Simplify 2√12
4√3
300
Simplify √18+√2
4√2
300
Simplify -3 √7r^3 ⋅ 6√7r^2
-126r^2√r
300
Simplify (√5 + √8) (√45 + √8)
23 + 8√10
300

This shape is never wrong… it’s always “right.”

Right triangle

400
Simplify √384
8√6
400
Simplify 6√7 + √2 + √7
√2 + 7√7
400
Find the area of rectangle with length = √24 and width = √8
8√3
400
Simplify √6(4√12 + 5√8)
24√2 + 20√3
400

This number refuses to stay real.

Imaginary number

500
Simplify -7√96
-28√6
500
Simplify 2√64 + 8√100
96
500
If P is power (in watts) and R is resistance (in ohms), then the voltage V necessary to run the circuit is V= √PR Find the voltage necessary to run a 40–watt amplifier with a resistance of 150 ohms.
20√15
500
Simplify (3√20 + 4√25)(4√5 - 3√4)
28√5
500

This famous sequence starts 1, 1, 2, 3, 5…

Fibonacci sequence

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