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[Answer] Which statement about 6×2 + 7x – 10 is true?
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Which statement about 6×2 + 7x – 10 is true?
In mathematics the degree of a polynomial is the highest of the degrees of the polynomial’s monomials (individual terms) with non-zero coefficients. The degree of a term is the sum of the exponents of the variables that appear in it and thus is a non-negative integer.For a univariate polynomial the degree of the polynomial is simply the highest exponent occurring in the polynomial.
In mathematics a polynomial is an expression consisting of variables (also called indeterminates) and coefficients that involves only the operations of addition subtraction multiplication and non-negative integer exponentiation of variables. An example of a polynomial of a single indeterminate x is x 2 − 4x + 7.An example in three variables is x 3 + 2xyz 2 − yz + 1.
In mathematics a coefficient is a multiplicative factor in some term of a polynomial a series or any expression; it is usually a number but may be any expression (including variables such as a b and c). In the latter case the variables appearing in the coefficients are often called parameters and must be clearly distinguished from the other variables.
Fri May 16 2003 14:30:00 GMT-0400 (Eastern Daylight Time) · In mathematics the additive inverse of a number a is the number that when added to a yields zero.This number is also known as the opposite (number) sign change and negation. For a real number it reverses its sign: the additive inverse (opposit…
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Which algebraic expression is a polynomial with a degree – Which statement about 6×2 + 7x – 10 is true? Answers: 3. continue. Mathematics, 22.06.2019 04:40, jahsehsgold. The quadratic function that's x intercept is at (8,0), y intercept at (0,-32), the maximum value is (6,4) and the axis of symmetry is at x=6. Answers: 3. continue.Solving 6x 2-7x-10 = 0 directly . Earlier we factored this polynomial by splitting the middle term. let us now solve the equation by Completing The Square and by using the Quadratic Formula. Parabola, Finding the Vertex : 4.1 Find the Vertex of y = 6x 2-7x-10 Parabolas have a highest or a lowest point called the Vertex .Which statement about 6×2 + 7x – 10 is true? A. Which polynomial is factored completely? D. A student factors 3×2 – 12 to the following. 3(x2 – 4) Which statement about 3(x2 – 4) is true? B. What is the completely factored form of x4 + 8×2 – 9? B. What is the completely factored form of x3 – 64x? C.
Solve Quadratic equations 6x^2-7x-10=0 Tiger Algebra Solver – Question: Which statement about 6×2 + 7x – 10 is true? A woodworker wants to earn at least $25 an hour making and selling cabinets.True False Equations Calculator: Enter statement on each side of the equationWhich statement about 6×2 + 7x – 10 is true? One of the factors is (x + 2). One of the factors is (3x – 2). One of the factors is (2x + 5). One of the factors is (x – 5). = 7x + 3x – 14 Part A: Solve the equation and write the number of solutions. Show all the steps. Part B: Name one property you used to solve this equation. Asked By
Factoring Polynomials Completely Flashcards | Quizlet – sorry for all the questions, but: 1) In which interval is the function f(x) = -4x^2 + 12x + 1 increasing? 2) What are the critical values on the graph of y = x4 + 6×2 – 5? 3) What are the critical values on the graph of y = x4 + 6×2 – 5? 4) Find the x-coordinate of the point(s) of inflection on the graph of y = 2×3 + 18×2 – 3x + 4. Thanks all i can offer is a best answer an/or a thumbs upWhich of these statements are true? answer choices = 7x 2 is true ? answer choices . The graph of g is narrower than the graph of f. The graph of g is wider than the graph of f. y = 10(0.75) x are true? Choose ALL that are true. answer choices . The coordinates of the x-intercept are (10,0).Which of the statements about the following quadratic equation is true? 6×2 – 8 = 4×2 + 7x. Answers. abraham1366. 6x^2 – 8 = 4x^2 + 7x 6x^2 – 4x^2 – 7x – 8 = 0 2x^2 – 7x – 8 = 0 Which of the following statements is true? a. all similar figures ar…
Soal dan Penyelesaian Turunan Fungsi part 1 – .
Find the area of the region bounded by the line y = 3x + 2, the x axis and the ordinates x = –1 and – .
Nth Derivative of Exponential Function – Successive Differentiation – Engineering Mathematics 1 – Hi Guys, So in this video we are going to see nth derivative of some of the functions so let's start with the first function I am assuming that Y is equal to e raised to M X so let's start and find out what could be the nth derivative of e raised to M X now to find out y n that is n derivative of the given function we will always start with the first derivative so my technique will be to first find out the first derivative then second derivative third derivative and then from first three answers we will predict that what could be the nth derivative so let's start with the first derivative so first derivative is given by y1 now if I find the first derivative you all know that the derivative of e raised to M X is M into e raised to M X if I will find the second derivative it will be M square into e raised to M X similarly if I'll try to find out nth derivative then let's observe the pattern so in the first derivative if you'll observe then the power of M is 1 in second derivative the power is 2 so similarly can I say that in the nth derivative the power will be n yes definitely so similarly here he raised to M X terms remains same in all the derivatives so I can say that in the nth derivative also he raised to M X will be there so the formula for y equal to e raised to M X is yn equal to M raised to n into e raised to M X so this is the nth derivative of e raised to M X let us take one more example now the second question is what is NC derivative of e raised to M now guys let's start with the similar technique so here again we'll find out first derivative second derivative third derivative and from these three derivatives we will guess what could be the nth derivative so I am finding the first derivative so y1 in this case will be here is 2m X into log of a into M similarly if I find the second derivative of this term then M and log a are already constant so I will write it down as it is and if I find out the derivative of a raise to M X then it will be here is 2m X into log n so log a is twice so log e square and again M that is M square similarly if I will find the third that is why three so log a square is a constant we will take it as it is M square constant we will take it as it is and then we'll find out the derivative of a raise to M X so derivative of a raised to M X is a raised to M X into log n so this will become Q and M again so this will become M Q so hence the formula is a raised to M X log a cube and M cube so guys let's predict the nth derivative so similarly we will get and the derivative as here is 2m x as it is why because in all the three derivatives we were getting a raise to M X term next log in here in the first derivative log it was having the power 1 in the second derivative – and the third derivative three so I can say that in antiderivative this power will be n so log a raised to n similarly for M so in y1 M raised to 1 y2 M raised to 2 y 3 M raised to 3 so I can definitely say that yn it will be M raised to n and this becomes the formula for n 3 of a raise to M X now let's find out the next enter derivative so I am considering the function of trigonometry so let us say Y is sine of a x+ now guys be careful if I want to find out the derivative of this I will again start with the y1 y2 and y3 so here let's see now y1 will be derivative of this is cos of a X plus B into a now let's observe it if I'll find out y 2 from this y1 100% for the derivative of cos I will get minus of sine again from by 2 if I find out y 3 it will be again cos and hence it will change like cos sine cos sine but guys it will be very difficult to find out y n in that case because we don't know what is the value of n so hence to find out the antiderivative we will always convert the given function as sine only so yeah my job will be to convert this course into sine and then I will find out the further derivatives so you are if I convert the COS into sine then you all know the formula let sine of Pi by 2 plus theta is cos theta so I will say it is sine of PI by 2 plus theta that is ax plus B as it is an a was there so I have rewritten the y1 in terms of sine now let us find out why – from this y1 so again the derivative of this sign is cos of Pi by 2 plus ax plus B into a square because 1 a was there in the y1 and in the second derivative we are getting one more ring so it becomes a square but now if I will find y3 from this Casta then again I get sine so it is again mismatch as I said previously that every time we will convert the given function in terms of sine and then we'll find out the further derivative so here I am again converting cos in terms of sine now here this PI by 2 plus ax plus B is my theta so it is my cos theta so I will rewrite it as sine of PI by 2 plus theta because sine of PI by 2 plus theta is cos theta so this will become sine of PI by 2 plus theta now theta is this term that is PI by 2 plus ax plus B and a square as it is so now guys Here I am getting PI by 2 2 times so I will rewrite this as sine of 2 times pi by 2 plus ax plus B into a square this is my waifu now if i try to predict what could be the wire then it's very easy see here in why I was just having angle as ax plus B in y1 I got angle as ax plus B plus Phi by 2 that is PI by 2 is only once in Y – I am getting angle as ax plus B and PI by 2 twice so it means the PI by 2 terms is increasing every time so can I say when I will find the antiderivative I will get PI by 2 n times so hence this becomes sine of a X plus B plus n PI by 2 similarly if you observe the constant a in the first derivative y1 it was just a raised one in y2 it was a square and similarly in Y n we will get a raise to n and this becomes our formula for the nth derivative of sine of a X plus B .