ACTIVITY 4 DETERMINE ORIGINAL VALUE 1. The value of an item after \( 15 \% \) VAT was added is R 155,50 . What was the value of the item before VAT was added? 2. During 2022 the price of an article increased by \( 7,5 \% \) to R 3350,00 . What was the price of the article before the increase? 3. Sello received a \( 5,5 \% \) increase in his salary. His salary after the increase was R 35500 . What was his salary before the increase? 4. Due to inflation, the price of bread increased by \( 4,5 \% \) to R 16,99 . Calculate the price of the bread before the increase due to inflation. 5. House prices in KwaZulu-Natal increased on average by \( 18 \% \) from 2006 to 2007 . If a house cost R 680000 in 2008 , how much would that same house have cost in 2006 ? A bicycle costs R 755,00 including VAT. If VAT is \( 15 \% \) how much VAT is included in the price of the bicycle?

Let's solve each of the problems step by step. ### Problem 1 **Given:** The value of an item after \( 15\% \) VAT is R 155.50. **To find:** The value of the item before VAT was added. Let \( x \) be the original value before VAT. The equation can be set up as follows: \[ x + 0.15x = 155.50 \] This simplifies to: \[ 1.15x = 155.50 \] Now, we can solve for \( x \): \[ x = \frac{155.50}{1.15} \] ### Problem 2 **Given:** The price of an article increased by \( 7.5\% \) to R 3350.00. **To find:** The price of the article before the increase. Let \( y \) be the original price. The equation is: \[ y + 0.075y = 3350 \] This simplifies to: \[ 1.075y = 3350 \] Now, we can solve for \( y \): \[ y = \frac{3350}{1.075} \] ### Problem 3 **Given:** Sello received a \( 5.5\% \) increase in his salary, and his salary after the increase was R 35500. **To find:** His salary before the increase. Let \( z \) be the original salary. The equation is: \[ z + 0.055z = 35500 \] This simplifies to: \[ 1.055z = 35500 \] Now, we can solve for \( z \): \[ z = \frac{35500}{1.055} \] ### Problem 4 **Given:** The price of bread increased by \( 4.5\% \) to R 16.99. **To find:** The price of the bread before the increase. Let \( w \) be the original price. The equation is: \[ w + 0.045w = 16.99 \] This simplifies to: \[ 1.045w = 16.99 \] Now, we can solve for \( w \): \[ w = \frac{16.99}{1.045} \] ### Problem 5 **Given:** House prices increased by \( 18\% \) from 2006 to 2007, and a house cost R 680000 in 2008. **To find:** The cost of the house in 2006. Let \( v \) be the price in 2006. The equation is: \[ v + 0.18v = 680000 \] This simplifies to: \[ 1.18v = 680000 \] Now, we can solve for \( v \): \[ v = \frac{680000}{1.18} \] ### Problem 6 **Given:** A bicycle costs R 755.00 including VAT, and VAT is \( 15\% \). **To find:** How much VAT is included in the price of the bicycle. Let \( u \) be the original price before VAT. The equation is: \[ u + 0.15u = 755 \] This simplifies to: \[ 1.15u = 755 \] Now, we can solve for \( u \): \[ u = \frac{755}{1.15} \] Now, let's calculate all the values. Solve the equation by following steps: - step0: Solve for \(w\): \(1.045w=16.99\) - step1: Divide both sides: \(\frac{1.045w}{1.045}=\frac{16.99}{1.045}\) - step2: Divide the numbers: \(w=\frac{3398}{209}\) Solve the equation \( 1.055z=35500 \). Solve the equation by following steps: - step0: Solve for \(z\): \(1.055z=35500\) - step1: Divide both sides: \(\frac{1.055z}{1.055}=\frac{35500}{1.055}\) - step2: Divide the numbers: \(z=\frac{7100000}{211}\) Solve the equation \( 1.15u=755 \). Solve the equation by following steps: - step0: Solve for \(u\): \(1.15u=755\) - step1: Divide both sides: \(\frac{1.15u}{1.15}=\frac{755}{1.15}\) - step2: Divide the numbers: \(u=\frac{15100}{23}\) Solve the equation \( 1.15x=155.50 \). Solve the equation by following steps: - step0: Solve for \(x\): \(1.15x=155.5\) - step1: Divide both sides: \(\frac{1.15x}{1.15}=\frac{155.5}{1.15}\) - step2: Divide the numbers: \(x=\frac{3110}{23}\) Solve the equation \( 1.075y=3350 \). Solve the equation by following steps: - step0: Solve for \(y\): \(1.075y=3350\) - step1: Divide both sides: \(\frac{1.075y}{1.075}=\frac{3350}{1.075}\) - step2: Divide the numbers: \(y=\frac{134000}{43}\) Solve the equation \( 1.18v=680000 \). Solve the equation by following steps: - step0: Solve for \(v\): \(1.18v=680000\) - step1: Divide both sides: \(\frac{1.18v}{1.18}=\frac{680000}{1.18}\) - step2: Divide the numbers: \(v=\frac{34000000}{59}\) Here are the calculated values for each problem: ### Problem 1 The value of the item before VAT was added: \[ x = \frac{3110}{23} \approx 135.65 \] ### Problem 2 The price of the article before the increase: \[ y = \frac{134000}{43} \approx 3116.28 \] ### Problem 3 Sello's salary before the increase: \[ z = \frac{7100000}{211} \approx 33600.00 \] ### Problem 4 The price of the bread before the increase: \[ w = \frac{3398}{209} \approx 16.24 \] ### Problem 5 The cost of the house in 2006: \[ v = \frac{34000000}{59} \approx 576271.19 \] ### Problem 6 The original price of the bicycle before VAT: \[ u = \frac{15100}{23} \approx 655.22 \] ### VAT Calculation To find the VAT included in the price of the bicycle: \[ \text{VAT} = 755 - u \approx 755 - 655.22 \approx 99.78 \] ### Summary of Results 1. Original value before VAT: R 135.65 2. Price before increase: R 3116.28 3. Salary before increase: R 33600.00 4. Price of bread before increase: R 16.24 5. House price in 2006: R 576271.19 6. VAT included in the bicycle price: R 99.78 If you need further assistance or clarification, feel free to ask!