Mathieu is finding the x-intercepts of the function f(x) = x2 + 4x + 3. his work is shown below. 0 = x2 + 4x + 3 0 = (x + 3)(x + 1) x + 3 = x + 1 x = x – 2 0 = –2 there are no x-intercepts. which error did mathieu make? he factored incorrectly. he did not use the constant as the x-intercept. he set the factored expressions equal to each other. he incorrectly solved the equation x + 3 = x + 1.
Mathieu Is Finding The X-Intercepts Of The Function F(X) = X2 + 4X + 3. His Work Is Shown Below. 0 = X2 + 4X + 3 0 = (X + 3)(X + 1) X + 3 = X + 1 X = X – 2 0 = –2 There Are No X-Intercepts. Which Error Did Mathieu Make? He Factored Incorrectly. He Did Not Use The Constant As The X-Intercept. He Set The Factored Expressions Equal To Each Other. He Incorrectly Solved The Equation X + 3 = X + 1.
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Mathieu Is Finding The X-Intercepts Of The Function F(X) = X2 + 4X + 3. His Work Is Shown Below. 0 = X2 + 4X + 3 0 = (X + 3)(X + 1) X + 3 = X + 1 X = X – 2 0 = –2 There Are No X-Intercepts. Which Error Did Mathieu Make? He Factored Incorrectly. He Did Not Use The Constant As The X-Intercept. He Set The Factored Expressions Equal To Each Other. He Incorrectly Solved The Equation X + 3 = X + 1.. We are looking for two. (the photo is not provided) the answer is:
Mathieu is finding the xintercepts of the function f(x)=x^2+4x+3. His from brainly.com
Identify the true statement about inscribed angles and their intercepted arc. The intercepted arc is twice the. His work is shown below.
His Work Is Shown Below.
0 = x^2 + 4x + 3 step 2/3 factor the quadratic equation. (1 point) the intercepted arc is half the measure of the inscribed angle. The roots or solutions to this equation will give us the.
Next, Factor The Quadratic Equation.
We are looking for two. He set the factored expressions equal to eachother (he set the factored expressions.
His Work Is Shown Below.
The intercepted arc is twice the. Identify the true statement about inscribed angles and their intercepted arc. 0 = (x + 1) (x + 3) answer set each factor equal to 0 and solve.
