Solve the following equation in x: $$ 2(3x - 5) + 8 = 4x - 5 $$ Write $$\frac{3^{5}}{3^{6}}$$ in the form $$3^{k}$$, where $$k \in \mathbb{R}$$. Solve the simultaneous equations below to find the value of $$x$$ and the value of $$y$$. $$ 3x + 2y = 1 $$ $$ 7x + 5y = -2 $$

Leaving Cert Mathematics Algebra: Solve the following equation in

Solve the following equation in x: $$ 2(3x - 5) + 8 = 4x - 5 $$ Write $$\frac{3^{5}}{3^{6}}$$ in the form $$3^{k}$$, where $$k \in \mathbb{R}$$ - Leaving Cert Mathematics - Question 2 - 2023

Question 2

$Solve-the-following-equation-in-x:--$$-2(3x---5)-+-8-=-4x---5-$$--Write-$$\frac{3^{5}}{3^{6}}$$-in-the-form-$$3^{k}$$,-where-$$k-\in-\mathbb{R}$$-Leaving Cert Mathematics-Question 2-2023.png$

Solve the following equation in x: $$ 2(3x - 5) + 8 = 4x - 5 $$ Write $$\frac{3^{5}}{3^{6}}$$ in the form $$3^{k}$$, where $$k \in \mathbb{R}$$. Solve the simulta... show full transcript

Worked Solution & Example Answer:Solve the following equation in x: $$ 2(3x - 5) + 8 = 4x - 5 $$ Write $$\frac{3^{5}}{3^{6}}$$ in the form $$3^{k}$$, where $$k \in \mathbb{R}$$ - Leaving Cert Mathematics - Question 2 - 2023

Step 1

Solve the following equation in x:

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Answer

First, simplify the given equation:

2(3x - 5) + 8 = 4x - 5

Distributing the 2 gives:

6x - 10 + 8 = 4x - 5

Combine like terms:

6x - 2 = 4x - 5

Next, isolate the variable x by moving 4x to the left side:

6x - 4x = -5 + 2

This simplifies to:

2x = -3

Finally, divide both sides by 2:

x = -\frac{3}{2}

Step 2

Write $$\frac{3^{5}}{3^{6}}$$ in the form $$3^{k}$$, where $$k \in \mathbb{R}$$.

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Answer

To simplify the fraction, use the property of exponents:

$\frac{a^{m}}{a^{n}} = a^{m-n}$

Applying this to our problem:

$\frac{3^{5}}{3^{6}} = 3^{5 - 6} = 3^{-1}$

Thus, $k = -1$ .

Step 3

Solve the simultaneous equations below to find the value of x and the value of y.

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Answer

We have the following equations:

$3x + 2y = 1$
$7x + 5y = -2$

First, let's solve Equation 1 for y:

2y = 1 - 3x

Thus:

y = \frac{1 - 3x}{2}$$ Now substitute this into Equation 2:

7x + 5\left(\frac{1 - 3x}{2}\right) = -2

Multiply through by 2 to eliminate the fraction:

14x + 5(1 - 3x) = -4

Distributing gives:

14x + 5 - 15x = -4

Combine like terms:

-x + 5 = -4

Moving 5 to the right side:

-x = -4 - 5 \ -x = -9\

So:

x = 9$$

Now substitute the value of x back into our equation for y:

y = \frac{1 - 3(9)}{2}$$ Thus:

y = \frac{1 - 27}{2} = -13$$

The solutions are:

$x = 9$ and $y = -13$ .

Solve the following equation in x: $$ 2(3x - 5) + 8 = 4x - 5 $$ Write $$\frac{3^{5}}{3^{6}}$$ in the form $$3^{k}$$, where $$k \in \mathbb{R}$$ - Leaving Cert Mathematics - Question 2 - 2023

Worked Solution & Example Answer:Solve the following equation in x: $$ 2(3x - 5) + 8 = 4x - 5 $$ Write $$\frac{3^{5}}{3^{6}}$$ in the form $$3^{k}$$, where $$k \in \mathbb{R}$$ - Leaving Cert Mathematics - Question 2 - 2023

Solve the following equation in x:

Write $$\frac{3^{5}}{3^{6}}$$ in the form $$3^{k}$$, where $$k \in \mathbb{R}$$.

Solve the simultaneous equations below to find the value of x and the value of y.

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