y-intercept

y-intercepts of some functions

• In the case of linear functions, that is , the absolute (= constant) term of the function term indicates the y-axis intercept. Example :; the y-intercept is 7. A special case of this is:${\ displaystyle f (x) = mx + b}$${\ displaystyle f (x) = 3 \ cdot x + 7}$
• In the case of homogeneous linear (proportional) functions, i.e. whose graph runs through the origin of the coordinate system, the y-axis intercept is therefore 0.${\ displaystyle f (x) = mx}$
• Is the y-intercept of the linear function whose graph passes through points and${\ displaystyle (x_ {1}, y_ {1})}$${\ displaystyle (x_ {2}, y_ {2})}$

  ${\ displaystyle q = y_ {1} - {\ frac {y_ {1} -y_ {2}} {x_ {1} -x_ {2}}} x_ {1} = {\ frac {x_ {1} \ cdot y_ {2} -x_ {2} \ cdot y_ {1}} {x_ {1} -x_ {2}}}.}$

• For all power functions with the y-axis intercept is 0.${\ displaystyle f (x) = ax ^ {r}}$${\ displaystyle r> 0}$
• Even with quadratic functions (whose graph is a parabola) the absolute term (= constant term) of the function term indicates the y-axis intercept.${\ displaystyle c}$${\ displaystyle f (x) = ax ^ {2} + bx + c}$
• In general, this applies to all completely rational functions, i.e. for all functions whose function term is a polynomial. If the function term has the form , the absolute term indicates the y-axis intercept of the function graph.${\ displaystyle f (x) = a_ {n} x ^ {n} + \ dots + a_ {1} x + a_ {0}}$${\ displaystyle a_ {0}}$

• For exponential functions whose function term has the form , the function graph has the y-axis intercept . In particular, the y-axis intercept is equal to 1 for functions of the shape .${\ displaystyle f (x) = ca ^ {x}}$${\ displaystyle c}$${\ displaystyle f (x) = a ^ {x}}$

See also

• Zero of a function
• Intercept shape of lines and planes

Remarks

1. ↑ DMV: "First Aid: The Linear Function"