121176 The angle between a line with direction ratios \(2,2,1\) and the line joining the points \((3,1,4)\) and \((7,2,12\) )

121177 The angle between the lines whose direction cosines satisfy the equations \(l+\mathbf{m}+\mathbf{n}=\mathbf{0}\) and \(l^2\) \(+\mathbf{m}^2-\mathbf{n}^2=\mathbf{0}\) is

121178 Assertion (A) The direction ratios of line \(L_1\) are \(2,5,7\) and those of line \(L_2\) are \(\frac{4}{\sqrt{19}}, \frac{10}{\sqrt{19}}, \frac{14}{\sqrt{19}}\). The lines \(\mathrm{L}_1, \mathrm{~L}_2\) are parallel.
Reason (R) The direction ratios of a line \(L_1\) are \(a_1, b_1, c_1\) and those of another line \(L_2\) are \(a_2, b_2\), \(c_2\). The lines \(L_1\) and \(L_2\) are parallel if \(a_1 a_2+b_1 b_2\) \(+\mathbf{c}_1 \mathbf{c}_2=\mathbf{0}\)
The correct option among the following is

121180 If \(\frac{x-4}{1}=\frac{y-2}{1}=\frac{z-7}{2}\) lies in the plane \(a x+b y\) \(+z=7\), then \(a+b=\)

121176 The angle between a line with direction ratios \(2,2,1\) and the line joining the points \((3,1,4)\) and \((7,2,12\) )

121177 The angle between the lines whose direction cosines satisfy the equations \(l+\mathbf{m}+\mathbf{n}=\mathbf{0}\) and \(l^2\) \(+\mathbf{m}^2-\mathbf{n}^2=\mathbf{0}\) is

121178 Assertion (A) The direction ratios of line \(L_1\) are \(2,5,7\) and those of line \(L_2\) are \(\frac{4}{\sqrt{19}}, \frac{10}{\sqrt{19}}, \frac{14}{\sqrt{19}}\). The lines \(\mathrm{L}_1, \mathrm{~L}_2\) are parallel.
Reason (R) The direction ratios of a line \(L_1\) are \(a_1, b_1, c_1\) and those of another line \(L_2\) are \(a_2, b_2\), \(c_2\). The lines \(L_1\) and \(L_2\) are parallel if \(a_1 a_2+b_1 b_2\) \(+\mathbf{c}_1 \mathbf{c}_2=\mathbf{0}\)
The correct option among the following is

121180 If \(\frac{x-4}{1}=\frac{y-2}{1}=\frac{z-7}{2}\) lies in the plane \(a x+b y\) \(+z=7\), then \(a+b=\)

121176 The angle between a line with direction ratios \(2,2,1\) and the line joining the points \((3,1,4)\) and \((7,2,12\) )

121177 The angle between the lines whose direction cosines satisfy the equations \(l+\mathbf{m}+\mathbf{n}=\mathbf{0}\) and \(l^2\) \(+\mathbf{m}^2-\mathbf{n}^2=\mathbf{0}\) is

121178 Assertion (A) The direction ratios of line \(L_1\) are \(2,5,7\) and those of line \(L_2\) are \(\frac{4}{\sqrt{19}}, \frac{10}{\sqrt{19}}, \frac{14}{\sqrt{19}}\). The lines \(\mathrm{L}_1, \mathrm{~L}_2\) are parallel.
Reason (R) The direction ratios of a line \(L_1\) are \(a_1, b_1, c_1\) and those of another line \(L_2\) are \(a_2, b_2\), \(c_2\). The lines \(L_1\) and \(L_2\) are parallel if \(a_1 a_2+b_1 b_2\) \(+\mathbf{c}_1 \mathbf{c}_2=\mathbf{0}\)
The correct option among the following is

121180 If \(\frac{x-4}{1}=\frac{y-2}{1}=\frac{z-7}{2}\) lies in the plane \(a x+b y\) \(+z=7\), then \(a+b=\)

121176 The angle between a line with direction ratios \(2,2,1\) and the line joining the points \((3,1,4)\) and \((7,2,12\) )

121177 The angle between the lines whose direction cosines satisfy the equations \(l+\mathbf{m}+\mathbf{n}=\mathbf{0}\) and \(l^2\) \(+\mathbf{m}^2-\mathbf{n}^2=\mathbf{0}\) is

121178 Assertion (A) The direction ratios of line \(L_1\) are \(2,5,7\) and those of line \(L_2\) are \(\frac{4}{\sqrt{19}}, \frac{10}{\sqrt{19}}, \frac{14}{\sqrt{19}}\). The lines \(\mathrm{L}_1, \mathrm{~L}_2\) are parallel.
Reason (R) The direction ratios of a line \(L_1\) are \(a_1, b_1, c_1\) and those of another line \(L_2\) are \(a_2, b_2\), \(c_2\). The lines \(L_1\) and \(L_2\) are parallel if \(a_1 a_2+b_1 b_2\) \(+\mathbf{c}_1 \mathbf{c}_2=\mathbf{0}\)
The correct option among the following is

121180 If \(\frac{x-4}{1}=\frac{y-2}{1}=\frac{z-7}{2}\) lies in the plane \(a x+b y\) \(+z=7\), then \(a+b=\)