🧮 algebra

1. The problem is to understand and interpret the inequality $X \geq 0$. 2. This inequality states that the variable $X$ is greater than or equal to zero.

1. Start by stating the problem: Expand and simplify the expression $ (2x - 3)(3x + 5) $. 2. Use the distributive property (FOIL) to expand the product:

1. Við skulum byrja á að segja að þú ert að vísa til punktanna sem hafa ekki sama $x$-gildi eða sama $y$-gildi. Þetta þýðir að punktarnir eru ekki þar sem línurnar skerast eða fall

1. Staðfestum að þú vilt lausnir fyrir 3 jöfnuhneppi með samlagningaraðferð. 2. Hér eru þrjú dæmi á jöfnuhneppum sem lausn er beitt með samlagningaraðferð:

1. We are given the system of equations: $$\begin{cases} 2x + 3y = 12 \\ 4x - 3y = 6 \end{cases}$$

1. We are given three rows of numbers with sums: - Row 1: 4, 3, 6, 10 = 13

1. Staðfesta verkefnið: Við eigum að leysa jöfnuhneppi $3x+4y=11$ og $5x-6y=1$ með innsetningaaðferð, nota fyrstu jöfnuna til að leysa fyrir $y$. 2. Leiða $y$ úr fyrstu jöfnunni:

1. We are given the identity $$(x + 5)(x + 2)(x + a) \equiv x^3 + bx^2 + cx - 30$$ and asked to find integers $a$, $b$, and $c$. 2. First, expand the left side step-by-step.

1. The problem is to simplify the expression $|-3.14|$. 2. The absolute value function $|x|$ returns the distance of $x$ from 0 on the number line, which means it always outputs a

1. The problem is to find the value of $|-5|$. 2. The absolute value of a number is its distance from zero on the number line, regardless of direction.

1. **Problem 11:** Find the domain of $$f(x) = \sqrt[3]{\frac{x}{\sqrt{x}}}$$. - Step 1: Simplify the expression inside the cube root.

1. The problem is to evaluate the absolute value of the expression $|7|$. 2. The absolute value of a number is its distance from zero on the number line, regardless of direction.

1. **Problem 1: Finding (f o f o f)(1) given the curve y = f(x).** The graph shows the function $f(x)$ with key points: $f(1) = 2$ (from the given approximate coordinates near x=1)

1. **Problem statement**: Find the domain of $ (f+g)(x) $ where $ f(x)=\sqrt{x-1} $ and $ g(x)=\sqrt{1-x} $.

1. **State the problem:** We are given a function $$f(x) = \frac{2x}{5} - 1$$ and asked to find the value of $$f^{-1}(3) + f(-0.5)$$. 2. **Find $$f^{-1}(3)$$:**

1. Stating the problem for question 4: Find the domain of the function $$f(x) = \sqrt{\frac{3 - x}{5 - x}}$$. 2. To find the domain of $$f(x)$$, ensure the expression inside the sq

1. Stating the problem: Calculate the value of the expression $444 \times 6 + (40 \times 2) - 700 \times \left(4 \div 2\right)$.\n\n2. First, evaluate each multiplication and divis

1. **Problem 1:** Find the domain of the function $f(x) = \sqrt{x-1} + \sqrt{x+2}$. 2. To find the domain, ensure the expressions under the square roots are non-negative:

1. State the problem: Simplify the expression $$444 \times 6 + (40 \times 2) - 700 \times (4 + 2)$$. 2. Calculate each multiplication:

1. The problem is to solve the quadratic equation $3x^2 - x - 17 = 0$ for $x$. 2. Identify coefficients: $a=3$, $b=-1$, $c=-17$.

1. Stating the problem: Solve the equation $$\sqrt{x+8} + \sqrt{x+1} = 7$$. 2. Isolate one square root: Let’s isolate $$\sqrt{x+8}$$.