"What happens if you don't pay your exorcist? Simplify the following square roots. The answer to each problem will match a letter that will allow you to figure out the joke. 1. \( \sqrt{81} \) L! 4 2. \( \sqrt{9} \) O: \( 12 \sqrt{2} \) 3. \( \sqrt{28}- \) F: \( 8 \sqrt{2} \) 4. \( \sqrt{600} \) P: \( 11 \sqrt{3} \) 5. \( \sqrt{288} \) U: 9 6. \( \sqrt{45} \) G: \( 6 \sqrt{3} \) 7. \( \sqrt{108} \) E: \( 3 \sqrt{5} \) \( T: 3 \) 8. \( \sqrt{72} \) A: \( 6 \sqrt{5} \) 9. \( \sqrt{480} \) R: \( 6 \sqrt{2} \) 10. \( \sqrt{363} \) \[ y: 10 \sqrt{6} \] S: \( 4 \sqrt{30} \) I: \( 2 \sqrt{3} \) D: \( 2 \sqrt{7} \)

Calculate the value by following steps: - step0: Calculate: \(\sqrt{288}\) - step1: Write as a product: \(\sqrt{144\times 2}\) - step2: Write in exponential form: \(\sqrt{12^{2}\times 2}\) - step3: Use the properties of radicals: \(\sqrt{12^{2}}\times \sqrt{2}\) - step4: Simplify the root: \(12\sqrt{2}\) Calculate or simplify the expression \( \sqrt(108) \). Calculate the value by following steps: - step0: Calculate: \(\sqrt{108}\) - step1: Write as a product: \(\sqrt{36\times 3}\) - step2: Write in exponential form: \(\sqrt{6^{2}\times 3}\) - step3: Use the properties of radicals: \(\sqrt{6^{2}}\times \sqrt{3}\) - step4: Simplify the root: \(6\sqrt{3}\) Calculate or simplify the expression \( \sqrt(363) \). Calculate the value by following steps: - step0: Calculate: \(\sqrt{363}\) - step1: Write as a product: \(\sqrt{121\times 3}\) - step2: Write in exponential form: \(\sqrt{11^{2}\times 3}\) - step3: Use the properties of radicals: \(\sqrt{11^{2}}\times \sqrt{3}\) - step4: Simplify the root: \(11\sqrt{3}\) Calculate or simplify the expression \( \sqrt(9) \). Calculate the value by following steps: - step0: Calculate: \(\sqrt{9}\) - step1: Write in exponential form: \(\sqrt{3^{2}}\) - step2: Simplify the root: \(3\) Calculate or simplify the expression \( \sqrt(81) \). Calculate the value by following steps: - step0: Calculate: \(\sqrt{81}\) - step1: Write in exponential form: \(\sqrt{9^{2}}\) - step2: Simplify the root: \(9\) Calculate or simplify the expression \( \sqrt(28) \). Calculate the value by following steps: - step0: Calculate: \(\sqrt{28}\) - step1: Write as a product: \(\sqrt{4\times 7}\) - step2: Write in exponential form: \(\sqrt{2^{2}\times 7}\) - step3: Use the properties of radicals: \(\sqrt{2^{2}}\times \sqrt{7}\) - step4: Simplify the root: \(2\sqrt{7}\) Calculate or simplify the expression \( \sqrt(600) \). Calculate the value by following steps: - step0: Calculate: \(\sqrt{600}\) - step1: Write as a product: \(\sqrt{100\times 6}\) - step2: Write in exponential form: \(\sqrt{10^{2}\times 6}\) - step3: Use the properties of radicals: \(\sqrt{10^{2}}\times \sqrt{6}\) - step4: Simplify the root: \(10\sqrt{6}\) Calculate or simplify the expression \( \sqrt(45) \). Calculate the value by following steps: - step0: Calculate: \(\sqrt{45}\) - step1: Write as a product: \(\sqrt{9\times 5}\) - step2: Write in exponential form: \(\sqrt{3^{2}\times 5}\) - step3: Use the properties of radicals: \(\sqrt{3^{2}}\times \sqrt{5}\) - step4: Simplify the root: \(3\sqrt{5}\) Calculate or simplify the expression \( \sqrt(72) \). Calculate the value by following steps: - step0: Calculate: \(\sqrt{72}\) - step1: Write as a product: \(\sqrt{36\times 2}\) - step2: Write in exponential form: \(\sqrt{6^{2}\times 2}\) - step3: Use the properties of radicals: \(\sqrt{6^{2}}\times \sqrt{2}\) - step4: Simplify the root: \(6\sqrt{2}\) Calculate or simplify the expression \( \sqrt(480) \). Calculate the value by following steps: - step0: Calculate: \(\sqrt{480}\) - step1: Write as a product: \(\sqrt{16\times 30}\) - step2: Write in exponential form: \(\sqrt{4^{2}\times 30}\) - step3: Use the properties of radicals: \(\sqrt{4^{2}}\times \sqrt{30}\) - step4: Simplify the root: \(4\sqrt{30}\) Aquí están las simplificaciones de las raíces cuadradas: 1. \( \sqrt{81} = 9 \) - Esto corresponde a la letra **L**. 2. \( \sqrt{9} = 3 \) - Esto corresponde a la letra **O**. 3. \( \sqrt{28} = 2\sqrt{7} \) - Esto corresponde a la letra **F**. 4. \( \sqrt{600} = 10\sqrt{6} \) - Esto corresponde a la letra **P**. 5. \( \sqrt{288} = 12\sqrt{2} \) - Esto corresponde a la letra **U**. 6. \( \sqrt{45} = 3\sqrt{5} \) - Esto corresponde a la letra **G**. 7. \( \sqrt{108} = 6\sqrt{3} \) - Esto corresponde a la letra **E**. 8. \( \sqrt{72} = 6\sqrt{2} \) - Esto corresponde a la letra **A**. 9. \( \sqrt{480} = 4\sqrt{30} \) - Esto corresponde a la letra **R**. 10. \( \sqrt{363} = 11\sqrt{3} \) - Esto corresponde a la letra **S**. Ahora, juntando las letras obtenidas, podemos formar la respuesta a la broma: "¿Qué pasa si no pagas a tu exorcista?" La respuesta es "¡Te quedas poseído!"