Question
In the figure, is extended both sides up to D, E. ?



 none of these
The correct answer is:
Related Questions to study
In the figure, is extended up to D. If and
In the figure, is extended up to D. If and
In the figure, and then ?
In the figure, and then ?
The lines , m n are such that then
The lines , m n are such that then
In the figure, ?
In the figure, ?
In the figure, pqr. Then ?
In the figure, pqr. Then ?
In the figure, and bisects
In the figure, and bisects
According to the figure, which of the following is true ?
According to the figure, which of the following is true ?
In the figure, Find the value of x
In the figure, Find the value of x
In the given figure, pq and r is transversal to p,q If
In the given figure, pq and r is transversal to p,q If
From the figure, Then ( x – y)
From the figure, Then ( x – y)
In the figure, if then
In the figure, if then
In the figure, n is transversal to lines then
In the figure, n is transversal to lines then
In the figure, n is transversal to ,m then (x+y+z)(p+q+r)=?
In the figure, n is transversal to ,m then (x+y+z)(p+q+r)=?
According to the data given in figure, x = ?
According to the data given in figure, x = ?
Ramesh and Mahesh solve an equation. In solving Ramesh commits a mistake in constant term and finds the roots 8 and 2. Mahesh commits a mistake in the coefficient of x and finds the roots – 9 and – 1. The correct roots are
Here we were given that in solving Ramesh commits a mistake in constant term and finds the roots 8 and 2. Many might create incorrect quadratic equations using the provided roots because they don't multiply carefully, which results in errors in one of the equation's signs. So the solution is 9, 1.
Ramesh and Mahesh solve an equation. In solving Ramesh commits a mistake in constant term and finds the roots 8 and 2. Mahesh commits a mistake in the coefficient of x and finds the roots – 9 and – 1. The correct roots are
Here we were given that in solving Ramesh commits a mistake in constant term and finds the roots 8 and 2. Many might create incorrect quadratic equations using the provided roots because they don't multiply carefully, which results in errors in one of the equation's signs. So the solution is 9, 1.