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1. polynomial theorems 2. polynomial theorems remainder theorem if the polynomial p(x) is divided by (x – a), then the remainder is p(a) 3. polynomial theorems remainder…
1. polynomial division 2. polynomial division p x a x q x r x where; 3. polynomial division p x a x q x …
1. roots and coefficients 2. roots and coefficientsquadratics ax 2 bx c 0 3. roots and coefficientsquadratics ax 2 bx…
1. polynomial results 2. polynomial results 1. if p(x) has k distinct real zeros, a1 , a2 , a3 ,, ak , then; x a1 x a2 x a3 x …
1. polynomial functions 2. polynomial functions a real polynomial p(x) of degree n is an expression of the form; p x p0 p1 x p2 x 2 pn1…
1. tangent theorems 2. tangent theorems(7) assumption:the size of the angle between a tangent and the radius drawn to thepoint of contact is 90 degrees. 3. tangent theorems(7)…
1. circle geometry 2. circle geometry circle geometry definitions 3. circle geometry circle geometry definitions 4. circle geometry circle geometry definitions radius: an…
1. circle geometry 2. circle geometrycircle geometry definitions 3. circle geometrycircle geometry definitions 4. circle geometrycircle geometry definitionsradius: an interval…
1. angle theorems 2. angle theorems(5b) opposite angles of a cyclic quadrilateral are supplementary. 3. angle theorems(5b) opposite angles of a cyclic quadrilateral are supplementary.adob…
angle theorems angle theorems (4) the angle subtended by an arc (or chord) at the centre is double the angle subtended by the arc (or chord) at the circumference. angle theorems…
r u r a l s e r i e s ° 0 200 400 600 800 1000 1200 1400m scale 1:25000 (a4) cr ow t13/4 t13/15 t13/12 t14/17 t14/12 u14/152 u14/151 t13/5 t13/4 t13/4 t13/13 t14/16 t14/16
pericarditis aguda hospital general issste veracruz dr.manuel diaz escalera pericarditis recordar que el pericardio es una hoja serosa que envuelve al corazón , compuesta…
1. approximations to areas (1) trapezoidal rule yy = f(x) abx 2. approximations to areas (1) trapezoidal rule yy = f(x) abx 3. approximations to areas (1) trapezoidal rule…
1. volumes of solids of revolutiony y = f(x) x 2. volumes of solids of revolutionyy = f(x)a b x 3. volumes of solids of revolutionyy = f(x)a b x 4. volumes of solids of revolutionyy…
1. (1) area below x axis areasy y = f(x) x 2. (1) area below x axisareasyy = f(x) a1 ab x 3. (1) area below x axisareasyy = f(x) a1 ab x f x dx 0ba 4. (1)…
1. concavity 2. concavity the second deriviative measures the change in slope with respect to x, this is known as concavity 3. concavity the second deriviative measures the…
1. volumes of solids of revolutiony y = f(x) x 2. volumes of solids of revolutionyy = f(x)a b x 3. volumes of solids of revolutionyy = f(x)a b x 4. volumes of solids of revolutionyy…
1. (1) area below x axis areasy y = f(x) x 2. (1) area below x axisareasyy = f(x) a1 ab x 3. (1) area below x axisareasyy = f(x) a1 ab x f x dx 0ba 4. (1)…
the slope (gradient) the slope (gradient) vertical rise(1) horizontal run m the slope (gradient) vertical rise(1) horizontal run m y x the slope (gradient) vertical…
approximations to areas (1) trapezoidal rule y x y = f(x) a b approximations to areas (1) trapezoidal rule y x y = f(x) a b approximations to areas (1) trapezoidal rule y…