Remove lint for logarithm division identity
This commit is contained in:
Krishna Sai Veera Reddy
parent
fd2506bcbf
commit
bc03f465c3
@ -4,12 +4,11 @@ use crate::consts::{
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};
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use crate::utils::*;
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use if_chain::if_chain;
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use rustc::declare_lint_pass;
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use rustc::hir::*;
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use rustc::lint::{LateContext, LateLintPass, LintArray, LintPass};
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use rustc_hir::*;
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use rustc_lint::{LateContext, LateLintPass};
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use rustc::ty;
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use rustc_errors::Applicability;
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use rustc_session::declare_tool_lint;
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use rustc_session::{declare_lint_pass, declare_tool_lint};
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use std::f32::consts as f32_consts;
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use std::f64::consts as f64_consts;
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use sugg::Sugg;
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@ -278,84 +277,6 @@ fn check_expm1(cx: &LateContext<'_, '_>, expr: &Expr) {
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}
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}
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// Checks whether two expressions evaluate to the same value
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fn are_exprs_equivalent(cx: &LateContext<'_, '_>, left: &Expr, right: &Expr) -> bool {
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// Checks whether the values are constant and equal
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if_chain! {
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if let Some((left_value, _)) = constant(cx, cx.tables, left);
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if let Some((right_value, _)) = constant(cx, cx.tables, right);
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if left_value == right_value;
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then {
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return true;
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}
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}
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// Checks whether the expressions resolve to the same variable
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if_chain! {
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if let ExprKind::Path(ref left_qpath) = left.kind;
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if let QPath::Resolved(_, ref left_path) = *left_qpath;
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if left_path.segments.len() == 1;
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if let def::Res::Local(left_local_id) = qpath_res(cx, left_qpath, left.hir_id);
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if let ExprKind::Path(ref right_qpath) = right.kind;
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if let QPath::Resolved(_, ref right_path) = *right_qpath;
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if right_path.segments.len() == 1;
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if let def::Res::Local(right_local_id) = qpath_res(cx, right_qpath, right.hir_id);
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if left_local_id == right_local_id;
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then {
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return true;
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}
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}
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false
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}
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fn check_log_division(cx: &LateContext<'_, '_>, expr: &Expr) {
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let log_methods = ["log", "log2", "log10", "ln"];
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if_chain! {
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if let ExprKind::Binary(op, ref lhs, ref rhs) = expr.kind;
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if op.node == BinOpKind::Div;
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if cx.tables.expr_ty(lhs).is_floating_point();
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if let ExprKind::MethodCall(left_path, _, left_args) = &lhs.kind;
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if cx.tables.expr_ty(&left_args[0]).is_floating_point();
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if let ExprKind::MethodCall(right_path, _, right_args) = &rhs.kind;
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if cx.tables.expr_ty(&right_args[0]).is_floating_point();
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let left_method = left_path.ident.name.as_str();
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if left_method == right_path.ident.name.as_str();
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if log_methods.iter().any(|&method| left_method == method);
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then {
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let left_recv = &left_args[0];
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let right_recv = &right_args[0];
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// Return early when bases are not equal
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if left_method == "log" && !are_exprs_equivalent(cx, &left_args[1], &right_args[1]) {
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return;
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}
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// Reduce the expression further for bases 2, 10 and e
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let suggestion = if let Some(method) = get_specialized_log_method(cx, right_recv) {
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format!("{}.{}()", Sugg::hir(cx, left_recv, ".."), method)
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} else {
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format!(
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"{}.log({})",
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Sugg::hir(cx, left_recv, ".."),
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Sugg::hir(cx, right_recv, "..")
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)
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};
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span_lint_and_sugg(
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cx,
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FLOATING_POINT_IMPROVEMENTS,
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expr.span,
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"x.log(b) / y.log(b) can be reduced to x.log(y)",
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"consider using",
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suggestion,
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Applicability::MachineApplicable,
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);
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}
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}
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}
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impl<'a, 'tcx> LateLintPass<'a, 'tcx> for FloatingPointArithmetic {
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fn check_expr(&mut self, cx: &LateContext<'a, 'tcx>, expr: &'tcx Expr) {
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if let ExprKind::MethodCall(ref path, _, args) = &expr.kind {
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@ -371,7 +292,6 @@ impl<'a, 'tcx> LateLintPass<'a, 'tcx> for FloatingPointArithmetic {
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}
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} else {
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check_expm1(cx, expr);
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check_log_division(cx, expr);
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}
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}
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}
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@ -54,30 +54,4 @@ fn check_ln1p() {
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let _ = (1.0 + x - 2.0).ln();
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}
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fn check_log_division() {
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let x = 3f32;
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let y = 2f32;
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let b = 4f32;
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let _ = x.log2() / y.log2();
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let _ = x.log10() / y.log10();
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let _ = x.ln() / y.ln();
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let _ = x.log(4.0) / y.log(4.0);
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let _ = x.log(b) / y.log(b);
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let _ = x.log(b) / y.log(x);
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let _ = x.log(b) / 2f32.log(b);
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let x = 3f64;
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let y = 2f64;
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let b = 4f64;
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let _ = x.log2() / y.log2();
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let _ = x.log10() / y.log10();
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let _ = x.ln() / y.ln();
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let _ = x.log(4.0) / y.log(4.0);
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let _ = x.log(b) / y.log(b);
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let _ = x.log(b) / y.log(x);
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let _ = x.log(b) / 2f64.log(b);
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}
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fn main() {}
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@ -168,77 +168,5 @@ error: ln(1 + x) can be computed more accurately
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LL | let _ = (x * 2.0 + 1.0).ln();
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| ^^^^^^^^^^^^^^^^^^^^ help: consider using: `(x * 2.0).ln_1p()`
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error: x.log(b) / y.log(b) can be reduced to x.log(y)
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--> $DIR/floating_point_log.rs:62:13
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LL | let _ = x.log2() / y.log2();
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| ^^^^^^^^^^^^^^^^^^^ help: consider using: `x.log(y)`
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error: x.log(b) / y.log(b) can be reduced to x.log(y)
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--> $DIR/floating_point_log.rs:63:13
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LL | let _ = x.log10() / y.log10();
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| ^^^^^^^^^^^^^^^^^^^^^ help: consider using: `x.log(y)`
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error: x.log(b) / y.log(b) can be reduced to x.log(y)
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--> $DIR/floating_point_log.rs:64:13
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LL | let _ = x.ln() / y.ln();
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| ^^^^^^^^^^^^^^^ help: consider using: `x.log(y)`
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error: x.log(b) / y.log(b) can be reduced to x.log(y)
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--> $DIR/floating_point_log.rs:65:13
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LL | let _ = x.log(4.0) / y.log(4.0);
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| ^^^^^^^^^^^^^^^^^^^^^^^ help: consider using: `x.log(y)`
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error: x.log(b) / y.log(b) can be reduced to x.log(y)
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--> $DIR/floating_point_log.rs:66:13
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LL | let _ = x.log(b) / y.log(b);
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| ^^^^^^^^^^^^^^^^^^^ help: consider using: `x.log(y)`
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error: x.log(b) / y.log(b) can be reduced to x.log(y)
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--> $DIR/floating_point_log.rs:68:13
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LL | let _ = x.log(b) / 2f32.log(b);
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| ^^^^^^^^^^^^^^^^^^^^^^ help: consider using: `x.log2()`
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error: x.log(b) / y.log(b) can be reduced to x.log(y)
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--> $DIR/floating_point_log.rs:74:13
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LL | let _ = x.log2() / y.log2();
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| ^^^^^^^^^^^^^^^^^^^ help: consider using: `x.log(y)`
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error: x.log(b) / y.log(b) can be reduced to x.log(y)
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--> $DIR/floating_point_log.rs:75:13
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LL | let _ = x.log10() / y.log10();
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| ^^^^^^^^^^^^^^^^^^^^^ help: consider using: `x.log(y)`
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error: x.log(b) / y.log(b) can be reduced to x.log(y)
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--> $DIR/floating_point_log.rs:76:13
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LL | let _ = x.ln() / y.ln();
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| ^^^^^^^^^^^^^^^ help: consider using: `x.log(y)`
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error: x.log(b) / y.log(b) can be reduced to x.log(y)
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--> $DIR/floating_point_log.rs:77:13
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LL | let _ = x.log(4.0) / y.log(4.0);
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| ^^^^^^^^^^^^^^^^^^^^^^^ help: consider using: `x.log(y)`
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error: x.log(b) / y.log(b) can be reduced to x.log(y)
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--> $DIR/floating_point_log.rs:78:13
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LL | let _ = x.log(b) / y.log(b);
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| ^^^^^^^^^^^^^^^^^^^ help: consider using: `x.log(y)`
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error: x.log(b) / y.log(b) can be reduced to x.log(y)
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--> $DIR/floating_point_log.rs:80:13
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LL | let _ = x.log(b) / 2f64.log(b);
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| ^^^^^^^^^^^^^^^^^^^^^^ help: consider using: `x.log2()`
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error: aborting due to 40 previous errors
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error: aborting due to 28 previous errors
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