If the vector form of the equation of a like in R2 is q = p...

given the equation of a line ax+by+c=0 how can i find the normal vector to it??

given the equation of a line ax+by+c=0 how can i find the normal vector to it??

Solve the Bernoulli differential equation. The Bernoulli equation is a well-known nonlinear equation of the form...

Solve the Bernoulli differential equation. The Bernoulli equation is a well-known nonlinear equation of the form y' + P(x)y = Q(x)yn that can be reduced to a linear form by a substitution. The general solution of a Bernoulli equation is y1 − ne∫(1 − n)P(x) dx = (1 − n)Q(x)e∫(1 − n)P(x) dx dx + C. (Enter your solution in the form F(x, y) = C or y = F(x, C) where C is a needed constant.) y' − 10y...

Solve the Bernoulli differential equation. The Bernoulli equation is a well-known nonlinear equation of the form...

Solve the Bernoulli differential equation. The Bernoulli equation is a well-known nonlinear equation of the form y' + P(x)y = Q(x)yn that can be reduced to a linear form by a substitution. The general solution of a Bernoulli equation is y1 − ne∫(1 − n)P(x) dx = (1 − n)Q(x)e∫(1 − n)P(x) dx dx + C. (Enter your solution in the form F(x, y) = C or y = F(x, C) where C is a needed constant.) y8y' − 5y9...

(a) Let T be any linear transformation from R2 to R2 and v be any vector...

(a) Let T be any linear transformation from R2 to R2 and v be any vector in R2 such that T(2v) = T(3v) = 0. Determine whether the following is true or false, and explain why: (i) v = 0, (ii) T(v) = 0. (b) Find the matrix associated to the geometric transformation on R2 that first reflects over the y-axis and then contracts in the y-direction by a factor of 1/3 and expands in the x direction by a...

(1 point) A Bernoulli differential equation is one of the form dydx+P(x)y=Q(x)yn     (∗) Observe that, if n=0...

(1 point) A Bernoulli differential equation is one of the form dydx+P(x)y=Q(x)yn     (∗) Observe that, if n=0 or 1, the Bernoulli equation is linear. For other values of n, the substitution u=y1−n transforms the Bernoulli equation into the linear equation dudx+(1−n)P(x)u=(1−n)Q(x).dudx+(1−n)P(x)u=(1−n)Q(x). Consider the initial value problem y′=−y(1+9xy3),   y(0)=−3. (a) This differential equation can be written in the form (∗) with P(x)= , Q(x)= , and n=. (b) The substitution u= will transform it into the linear equation dudx+ u= . (c) Using...

Write the line through p=(2,−5,−2) in the direction of v = 〈4,2,−5〉 in vector parametric form:...

Write the line through p=(2,−5,−2) in the direction of v = 〈4,2,−5〉 in vector parametric form: L(t) = ?

Verify this axiom of a vector space. Vector space: A subspace of R2: the set of...

Verify this axiom of a vector space. Vector space: A subspace of R2: the set of all dimension-2 vectors [x; y] whose entries x and y are odd integers. Axiom 1: The sum u + v is in V.

Find the equation of the line (in standard form Ax + By= C , please) passing...

Find the equation of the line (in standard form Ax + By= C , please) passing through the vertex of the parabola x^2 + y- 2x + 6=0 and perpendicular to the line with equation 3x - 2y = 2 .

A Bernoulli differential equation is one of the form dy/dx+P(x)y=Q(x)y^n (∗) Observe that, if n=0 or...

A Bernoulli differential equation is one of the form dy/dx+P(x)y=Q(x)y^n (∗) Observe that, if n=0 or 1, the Bernoulli equation is linear. For other values of n, the substitution u=y^(1−n) transforms the Bernoulli equation into the linear equation du/dx+(1−n)P(x)u=(1−n)Q(x). Consider the initial value problem xy′+y=−8xy^2, y(1)=−1. (a) This differential equation can be written in the form (∗) with P(x)=_____, Q(x)=_____, and n=_____. (b) The substitution u=_____ will transform it into the linear equation du/dx+______u=_____. (c) Using the substitution in part...

A Bernoulli differential equation is one of the form dxdy+P(x)y=Q(x)yn Observe that, if n=0 or 1,...

A Bernoulli differential equation is one of the form dxdy+P(x)y=Q(x)yn Observe that, if n=0 or 1, the Bernoulli equation is linear. For other values of n, the substitution u=y^(1−n) transforms the Bernoulli equation into the linear equation du/dx+(1−n)P(x)u=(1−n)Q(x) Use an appropriate substitution to solve the equation y'−(3/x)y=y^4/x^2 and find the solution that satisfies y(1)=1